| Explanation of the Linux-Kernel Memory Consistency Model |
| ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ |
| |
| :Author: Alan Stern <stern@rowland.harvard.edu> |
| :Created: October 2017 |
| |
| .. Contents |
| |
| 1. INTRODUCTION |
| 2. BACKGROUND |
| 3. A SIMPLE EXAMPLE |
| 4. A SELECTION OF MEMORY MODELS |
| 5. ORDERING AND CYCLES |
| 6. EVENTS |
| 7. THE PROGRAM ORDER RELATION: po AND po-loc |
| 8. A WARNING |
| 9. DEPENDENCY RELATIONS: data, addr, and ctrl |
| 10. THE READS-FROM RELATION: rf, rfi, and rfe |
| 11. CACHE COHERENCE AND THE COHERENCE ORDER RELATION: co, coi, and coe |
| 12. THE FROM-READS RELATION: fr, fri, and fre |
| 13. AN OPERATIONAL MODEL |
| 14. PROPAGATION ORDER RELATION: cumul-fence |
| 15. DERIVATION OF THE LKMM FROM THE OPERATIONAL MODEL |
| 16. SEQUENTIAL CONSISTENCY PER VARIABLE |
| 17. ATOMIC UPDATES: rmw |
| 18. THE PRESERVED PROGRAM ORDER RELATION: ppo |
| 19. AND THEN THERE WAS ALPHA |
| 20. THE HAPPENS-BEFORE RELATION: hb |
| 21. THE PROPAGATES-BEFORE RELATION: pb |
| 22. RCU RELATIONS: rcu-link, rcu-gp, rcu-rscsi, rcu-order, rcu-fence, and rb |
| 23. LOCKING |
| 24. PLAIN ACCESSES AND DATA RACES |
| 25. ODDS AND ENDS |
| |
| |
| |
| INTRODUCTION |
| ------------ |
| |
| The Linux-kernel memory consistency model (LKMM) is rather complex and |
| obscure. This is particularly evident if you read through the |
| linux-kernel.bell and linux-kernel.cat files that make up the formal |
| version of the model; they are extremely terse and their meanings are |
| far from clear. |
| |
| This document describes the ideas underlying the LKMM. It is meant |
| for people who want to understand how the model was designed. It does |
| not go into the details of the code in the .bell and .cat files; |
| rather, it explains in English what the code expresses symbolically. |
| |
| Sections 2 (BACKGROUND) through 5 (ORDERING AND CYCLES) are aimed |
| toward beginners; they explain what memory consistency models are and |
| the basic notions shared by all such models. People already familiar |
| with these concepts can skim or skip over them. Sections 6 (EVENTS) |
| through 12 (THE FROM_READS RELATION) describe the fundamental |
| relations used in many models. Starting in Section 13 (AN OPERATIONAL |
| MODEL), the workings of the LKMM itself are covered. |
| |
| Warning: The code examples in this document are not written in the |
| proper format for litmus tests. They don't include a header line, the |
| initializations are not enclosed in braces, the global variables are |
| not passed by pointers, and they don't have an "exists" clause at the |
| end. Converting them to the right format is left as an exercise for |
| the reader. |
| |
| |
| BACKGROUND |
| ---------- |
| |
| A memory consistency model (or just memory model, for short) is |
| something which predicts, given a piece of computer code running on a |
| particular kind of system, what values may be obtained by the code's |
| load instructions. The LKMM makes these predictions for code running |
| as part of the Linux kernel. |
| |
| In practice, people tend to use memory models the other way around. |
| That is, given a piece of code and a collection of values specified |
| for the loads, the model will predict whether it is possible for the |
| code to run in such a way that the loads will indeed obtain the |
| specified values. Of course, this is just another way of expressing |
| the same idea. |
| |
| For code running on a uniprocessor system, the predictions are easy: |
| Each load instruction must obtain the value written by the most recent |
| store instruction accessing the same location (we ignore complicating |
| factors such as DMA and mixed-size accesses.) But on multiprocessor |
| systems, with multiple CPUs making concurrent accesses to shared |
| memory locations, things aren't so simple. |
| |
| Different architectures have differing memory models, and the Linux |
| kernel supports a variety of architectures. The LKMM has to be fairly |
| permissive, in the sense that any behavior allowed by one of these |
| architectures also has to be allowed by the LKMM. |
| |
| |
| A SIMPLE EXAMPLE |
| ---------------- |
| |
| Here is a simple example to illustrate the basic concepts. Consider |
| some code running as part of a device driver for an input device. The |
| driver might contain an interrupt handler which collects data from the |
| device, stores it in a buffer, and sets a flag to indicate the buffer |
| is full. Running concurrently on a different CPU might be a part of |
| the driver code being executed by a process in the midst of a read(2) |
| system call. This code tests the flag to see whether the buffer is |
| ready, and if it is, copies the data back to userspace. The buffer |
| and the flag are memory locations shared between the two CPUs. |
| |
| We can abstract out the important pieces of the driver code as follows |
| (the reason for using WRITE_ONCE() and READ_ONCE() instead of simple |
| assignment statements is discussed later): |
| |
| int buf = 0, flag = 0; |
| |
| P0() |
| { |
| WRITE_ONCE(buf, 1); |
| WRITE_ONCE(flag, 1); |
| } |
| |
| P1() |
| { |
| int r1; |
| int r2 = 0; |
| |
| r1 = READ_ONCE(flag); |
| if (r1) |
| r2 = READ_ONCE(buf); |
| } |
| |
| Here the P0() function represents the interrupt handler running on one |
| CPU and P1() represents the read() routine running on another. The |
| value 1 stored in buf represents input data collected from the device. |
| Thus, P0 stores the data in buf and then sets flag. Meanwhile, P1 |
| reads flag into the private variable r1, and if it is set, reads the |
| data from buf into a second private variable r2 for copying to |
| userspace. (Presumably if flag is not set then the driver will wait a |
| while and try again.) |
| |
| This pattern of memory accesses, where one CPU stores values to two |
| shared memory locations and another CPU loads from those locations in |
| the opposite order, is widely known as the "Message Passing" or MP |
| pattern. It is typical of memory access patterns in the kernel. |
| |
| Please note that this example code is a simplified abstraction. Real |
| buffers are usually larger than a single integer, real device drivers |
| usually use sleep and wakeup mechanisms rather than polling for I/O |
| completion, and real code generally doesn't bother to copy values into |
| private variables before using them. All that is beside the point; |
| the idea here is simply to illustrate the overall pattern of memory |
| accesses by the CPUs. |
| |
| A memory model will predict what values P1 might obtain for its loads |
| from flag and buf, or equivalently, what values r1 and r2 might end up |
| with after the code has finished running. |
| |
| Some predictions are trivial. For instance, no sane memory model would |
| predict that r1 = 42 or r2 = -7, because neither of those values ever |
| gets stored in flag or buf. |
| |
| Some nontrivial predictions are nonetheless quite simple. For |
| instance, P1 might run entirely before P0 begins, in which case r1 and |
| r2 will both be 0 at the end. Or P0 might run entirely before P1 |
| begins, in which case r1 and r2 will both be 1. |
| |
| The interesting predictions concern what might happen when the two |
| routines run concurrently. One possibility is that P1 runs after P0's |
| store to buf but before the store to flag. In this case, r1 and r2 |
| will again both be 0. (If P1 had been designed to read buf |
| unconditionally then we would instead have r1 = 0 and r2 = 1.) |
| |
| However, the most interesting possibility is where r1 = 1 and r2 = 0. |
| If this were to occur it would mean the driver contains a bug, because |
| incorrect data would get sent to the user: 0 instead of 1. As it |
| happens, the LKMM does predict this outcome can occur, and the example |
| driver code shown above is indeed buggy. |
| |
| |
| A SELECTION OF MEMORY MODELS |
| ---------------------------- |
| |
| The first widely cited memory model, and the simplest to understand, |
| is Sequential Consistency. According to this model, systems behave as |
| if each CPU executed its instructions in order but with unspecified |
| timing. In other words, the instructions from the various CPUs get |
| interleaved in a nondeterministic way, always according to some single |
| global order that agrees with the order of the instructions in the |
| program source for each CPU. The model says that the value obtained |
| by each load is simply the value written by the most recently executed |
| store to the same memory location, from any CPU. |
| |
| For the MP example code shown above, Sequential Consistency predicts |
| that the undesired result r1 = 1, r2 = 0 cannot occur. The reasoning |
| goes like this: |
| |
| Since r1 = 1, P0 must store 1 to flag before P1 loads 1 from |
| it, as loads can obtain values only from earlier stores. |
| |
| P1 loads from flag before loading from buf, since CPUs execute |
| their instructions in order. |
| |
| P1 must load 0 from buf before P0 stores 1 to it; otherwise r2 |
| would be 1 since a load obtains its value from the most recent |
| store to the same address. |
| |
| P0 stores 1 to buf before storing 1 to flag, since it executes |
| its instructions in order. |
| |
| Since an instruction (in this case, P0's store to flag) cannot |
| execute before itself, the specified outcome is impossible. |
| |
| However, real computer hardware almost never follows the Sequential |
| Consistency memory model; doing so would rule out too many valuable |
| performance optimizations. On ARM and PowerPC architectures, for |
| instance, the MP example code really does sometimes yield r1 = 1 and |
| r2 = 0. |
| |
| x86 and SPARC follow yet a different memory model: TSO (Total Store |
| Ordering). This model predicts that the undesired outcome for the MP |
| pattern cannot occur, but in other respects it differs from Sequential |
| Consistency. One example is the Store Buffer (SB) pattern, in which |
| each CPU stores to its own shared location and then loads from the |
| other CPU's location: |
| |
| int x = 0, y = 0; |
| |
| P0() |
| { |
| int r0; |
| |
| WRITE_ONCE(x, 1); |
| r0 = READ_ONCE(y); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| WRITE_ONCE(y, 1); |
| r1 = READ_ONCE(x); |
| } |
| |
| Sequential Consistency predicts that the outcome r0 = 0, r1 = 0 is |
| impossible. (Exercise: Figure out the reasoning.) But TSO allows |
| this outcome to occur, and in fact it does sometimes occur on x86 and |
| SPARC systems. |
| |
| The LKMM was inspired by the memory models followed by PowerPC, ARM, |
| x86, Alpha, and other architectures. However, it is different in |
| detail from each of them. |
| |
| |
| ORDERING AND CYCLES |
| ------------------- |
| |
| Memory models are all about ordering. Often this is temporal ordering |
| (i.e., the order in which certain events occur) but it doesn't have to |
| be; consider for example the order of instructions in a program's |
| source code. We saw above that Sequential Consistency makes an |
| important assumption that CPUs execute instructions in the same order |
| as those instructions occur in the code, and there are many other |
| instances of ordering playing central roles in memory models. |
| |
| The counterpart to ordering is a cycle. Ordering rules out cycles: |
| It's not possible to have X ordered before Y, Y ordered before Z, and |
| Z ordered before X, because this would mean that X is ordered before |
| itself. The analysis of the MP example under Sequential Consistency |
| involved just such an impossible cycle: |
| |
| W: P0 stores 1 to flag executes before |
| X: P1 loads 1 from flag executes before |
| Y: P1 loads 0 from buf executes before |
| Z: P0 stores 1 to buf executes before |
| W: P0 stores 1 to flag. |
| |
| In short, if a memory model requires certain accesses to be ordered, |
| and a certain outcome for the loads in a piece of code can happen only |
| if those accesses would form a cycle, then the memory model predicts |
| that outcome cannot occur. |
| |
| The LKMM is defined largely in terms of cycles, as we will see. |
| |
| |
| EVENTS |
| ------ |
| |
| The LKMM does not work directly with the C statements that make up |
| kernel source code. Instead it considers the effects of those |
| statements in a more abstract form, namely, events. The model |
| includes three types of events: |
| |
| Read events correspond to loads from shared memory, such as |
| calls to READ_ONCE(), smp_load_acquire(), or |
| rcu_dereference(). |
| |
| Write events correspond to stores to shared memory, such as |
| calls to WRITE_ONCE(), smp_store_release(), or atomic_set(). |
| |
| Fence events correspond to memory barriers (also known as |
| fences), such as calls to smp_rmb() or rcu_read_lock(). |
| |
| These categories are not exclusive; a read or write event can also be |
| a fence. This happens with functions like smp_load_acquire() or |
| spin_lock(). However, no single event can be both a read and a write. |
| Atomic read-modify-write accesses, such as atomic_inc() or xchg(), |
| correspond to a pair of events: a read followed by a write. (The |
| write event is omitted for executions where it doesn't occur, such as |
| a cmpxchg() where the comparison fails.) |
| |
| Other parts of the code, those which do not involve interaction with |
| shared memory, do not give rise to events. Thus, arithmetic and |
| logical computations, control-flow instructions, or accesses to |
| private memory or CPU registers are not of central interest to the |
| memory model. They only affect the model's predictions indirectly. |
| For example, an arithmetic computation might determine the value that |
| gets stored to a shared memory location (or in the case of an array |
| index, the address where the value gets stored), but the memory model |
| is concerned only with the store itself -- its value and its address |
| -- not the computation leading up to it. |
| |
| Events in the LKMM can be linked by various relations, which we will |
| describe in the following sections. The memory model requires certain |
| of these relations to be orderings, that is, it requires them not to |
| have any cycles. |
| |
| |
| THE PROGRAM ORDER RELATION: po AND po-loc |
| ----------------------------------------- |
| |
| The most important relation between events is program order (po). You |
| can think of it as the order in which statements occur in the source |
| code after branches are taken into account and loops have been |
| unrolled. A better description might be the order in which |
| instructions are presented to a CPU's execution unit. Thus, we say |
| that X is po-before Y (written as "X ->po Y" in formulas) if X occurs |
| before Y in the instruction stream. |
| |
| This is inherently a single-CPU relation; two instructions executing |
| on different CPUs are never linked by po. Also, it is by definition |
| an ordering so it cannot have any cycles. |
| |
| po-loc is a sub-relation of po. It links two memory accesses when the |
| first comes before the second in program order and they access the |
| same memory location (the "-loc" suffix). |
| |
| Although this may seem straightforward, there is one subtle aspect to |
| program order we need to explain. The LKMM was inspired by low-level |
| architectural memory models which describe the behavior of machine |
| code, and it retains their outlook to a considerable extent. The |
| read, write, and fence events used by the model are close in spirit to |
| individual machine instructions. Nevertheless, the LKMM describes |
| kernel code written in C, and the mapping from C to machine code can |
| be extremely complex. |
| |
| Optimizing compilers have great freedom in the way they translate |
| source code to object code. They are allowed to apply transformations |
| that add memory accesses, eliminate accesses, combine them, split them |
| into pieces, or move them around. The use of READ_ONCE(), WRITE_ONCE(), |
| or one of the other atomic or synchronization primitives prevents a |
| large number of compiler optimizations. In particular, it is guaranteed |
| that the compiler will not remove such accesses from the generated code |
| (unless it can prove the accesses will never be executed), it will not |
| change the order in which they occur in the code (within limits imposed |
| by the C standard), and it will not introduce extraneous accesses. |
| |
| The MP and SB examples above used READ_ONCE() and WRITE_ONCE() rather |
| than ordinary memory accesses. Thanks to this usage, we can be certain |
| that in the MP example, the compiler won't reorder P0's write event to |
| buf and P0's write event to flag, and similarly for the other shared |
| memory accesses in the examples. |
| |
| Since private variables are not shared between CPUs, they can be |
| accessed normally without READ_ONCE() or WRITE_ONCE(). In fact, they |
| need not even be stored in normal memory at all -- in principle a |
| private variable could be stored in a CPU register (hence the convention |
| that these variables have names starting with the letter 'r'). |
| |
| |
| A WARNING |
| --------- |
| |
| The protections provided by READ_ONCE(), WRITE_ONCE(), and others are |
| not perfect; and under some circumstances it is possible for the |
| compiler to undermine the memory model. Here is an example. Suppose |
| both branches of an "if" statement store the same value to the same |
| location: |
| |
| r1 = READ_ONCE(x); |
| if (r1) { |
| WRITE_ONCE(y, 2); |
| ... /* do something */ |
| } else { |
| WRITE_ONCE(y, 2); |
| ... /* do something else */ |
| } |
| |
| For this code, the LKMM predicts that the load from x will always be |
| executed before either of the stores to y. However, a compiler could |
| lift the stores out of the conditional, transforming the code into |
| something resembling: |
| |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(y, 2); |
| if (r1) { |
| ... /* do something */ |
| } else { |
| ... /* do something else */ |
| } |
| |
| Given this version of the code, the LKMM would predict that the load |
| from x could be executed after the store to y. Thus, the memory |
| model's original prediction could be invalidated by the compiler. |
| |
| Another issue arises from the fact that in C, arguments to many |
| operators and function calls can be evaluated in any order. For |
| example: |
| |
| r1 = f(5) + g(6); |
| |
| The object code might call f(5) either before or after g(6); the |
| memory model cannot assume there is a fixed program order relation |
| between them. (In fact, if the function calls are inlined then the |
| compiler might even interleave their object code.) |
| |
| |
| DEPENDENCY RELATIONS: data, addr, and ctrl |
| ------------------------------------------ |
| |
| We say that two events are linked by a dependency relation when the |
| execution of the second event depends in some way on a value obtained |
| from memory by the first. The first event must be a read, and the |
| value it obtains must somehow affect what the second event does. |
| There are three kinds of dependencies: data, address (addr), and |
| control (ctrl). |
| |
| A read and a write event are linked by a data dependency if the value |
| obtained by the read affects the value stored by the write. As a very |
| simple example: |
| |
| int x, y; |
| |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(y, r1 + 5); |
| |
| The value stored by the WRITE_ONCE obviously depends on the value |
| loaded by the READ_ONCE. Such dependencies can wind through |
| arbitrarily complicated computations, and a write can depend on the |
| values of multiple reads. |
| |
| A read event and another memory access event are linked by an address |
| dependency if the value obtained by the read affects the location |
| accessed by the other event. The second event can be either a read or |
| a write. Here's another simple example: |
| |
| int a[20]; |
| int i; |
| |
| r1 = READ_ONCE(i); |
| r2 = READ_ONCE(a[r1]); |
| |
| Here the location accessed by the second READ_ONCE() depends on the |
| index value loaded by the first. Pointer indirection also gives rise |
| to address dependencies, since the address of a location accessed |
| through a pointer will depend on the value read earlier from that |
| pointer. |
| |
| Finally, a read event X and a write event Y are linked by a control |
| dependency if Y syntactically lies within an arm of an if statement and |
| X affects the evaluation of the if condition via a data or address |
| dependency (or similarly for a switch statement). Simple example: |
| |
| int x, y; |
| |
| r1 = READ_ONCE(x); |
| if (r1) |
| WRITE_ONCE(y, 1984); |
| |
| Execution of the WRITE_ONCE() is controlled by a conditional expression |
| which depends on the value obtained by the READ_ONCE(); hence there is |
| a control dependency from the load to the store. |
| |
| It should be pretty obvious that events can only depend on reads that |
| come earlier in program order. Symbolically, if we have R ->data X, |
| R ->addr X, or R ->ctrl X (where R is a read event), then we must also |
| have R ->po X. It wouldn't make sense for a computation to depend |
| somehow on a value that doesn't get loaded from shared memory until |
| later in the code! |
| |
| Here's a trick question: When is a dependency not a dependency? Answer: |
| When it is purely syntactic rather than semantic. We say a dependency |
| between two accesses is purely syntactic if the second access doesn't |
| actually depend on the result of the first. Here is a trivial example: |
| |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(y, r1 * 0); |
| |
| There appears to be a data dependency from the load of x to the store |
| of y, since the value to be stored is computed from the value that was |
| loaded. But in fact, the value stored does not really depend on |
| anything since it will always be 0. Thus the data dependency is only |
| syntactic (it appears to exist in the code) but not semantic (the |
| second access will always be the same, regardless of the value of the |
| first access). Given code like this, a compiler could simply discard |
| the value returned by the load from x, which would certainly destroy |
| any dependency. (The compiler is not permitted to eliminate entirely |
| the load generated for a READ_ONCE() -- that's one of the nice |
| properties of READ_ONCE() -- but it is allowed to ignore the load's |
| value.) |
| |
| It's natural to object that no one in their right mind would write |
| code like the above. However, macro expansions can easily give rise |
| to this sort of thing, in ways that often are not apparent to the |
| programmer. |
| |
| Another mechanism that can lead to purely syntactic dependencies is |
| related to the notion of "undefined behavior". Certain program |
| behaviors are called "undefined" in the C language specification, |
| which means that when they occur there are no guarantees at all about |
| the outcome. Consider the following example: |
| |
| int a[1]; |
| int i; |
| |
| r1 = READ_ONCE(i); |
| r2 = READ_ONCE(a[r1]); |
| |
| Access beyond the end or before the beginning of an array is one kind |
| of undefined behavior. Therefore the compiler doesn't have to worry |
| about what will happen if r1 is nonzero, and it can assume that r1 |
| will always be zero regardless of the value actually loaded from i. |
| (If the assumption turns out to be wrong the resulting behavior will |
| be undefined anyway, so the compiler doesn't care!) Thus the value |
| from the load can be discarded, breaking the address dependency. |
| |
| The LKMM is unaware that purely syntactic dependencies are different |
| from semantic dependencies and therefore mistakenly predicts that the |
| accesses in the two examples above will be ordered. This is another |
| example of how the compiler can undermine the memory model. Be warned. |
| |
| |
| THE READS-FROM RELATION: rf, rfi, and rfe |
| ----------------------------------------- |
| |
| The reads-from relation (rf) links a write event to a read event when |
| the value loaded by the read is the value that was stored by the |
| write. In colloquial terms, the load "reads from" the store. We |
| write W ->rf R to indicate that the load R reads from the store W. We |
| further distinguish the cases where the load and the store occur on |
| the same CPU (internal reads-from, or rfi) and where they occur on |
| different CPUs (external reads-from, or rfe). |
| |
| For our purposes, a memory location's initial value is treated as |
| though it had been written there by an imaginary initial store that |
| executes on a separate CPU before the main program runs. |
| |
| Usage of the rf relation implicitly assumes that loads will always |
| read from a single store. It doesn't apply properly in the presence |
| of load-tearing, where a load obtains some of its bits from one store |
| and some of them from another store. Fortunately, use of READ_ONCE() |
| and WRITE_ONCE() will prevent load-tearing; it's not possible to have: |
| |
| int x = 0; |
| |
| P0() |
| { |
| WRITE_ONCE(x, 0x1234); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| r1 = READ_ONCE(x); |
| } |
| |
| and end up with r1 = 0x1200 (partly from x's initial value and partly |
| from the value stored by P0). |
| |
| On the other hand, load-tearing is unavoidable when mixed-size |
| accesses are used. Consider this example: |
| |
| union { |
| u32 w; |
| u16 h[2]; |
| } x; |
| |
| P0() |
| { |
| WRITE_ONCE(x.h[0], 0x1234); |
| WRITE_ONCE(x.h[1], 0x5678); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| r1 = READ_ONCE(x.w); |
| } |
| |
| If r1 = 0x56781234 (little-endian!) at the end, then P1 must have read |
| from both of P0's stores. It is possible to handle mixed-size and |
| unaligned accesses in a memory model, but the LKMM currently does not |
| attempt to do so. It requires all accesses to be properly aligned and |
| of the location's actual size. |
| |
| |
| CACHE COHERENCE AND THE COHERENCE ORDER RELATION: co, coi, and coe |
| ------------------------------------------------------------------ |
| |
| Cache coherence is a general principle requiring that in a |
| multi-processor system, the CPUs must share a consistent view of the |
| memory contents. Specifically, it requires that for each location in |
| shared memory, the stores to that location must form a single global |
| ordering which all the CPUs agree on (the coherence order), and this |
| ordering must be consistent with the program order for accesses to |
| that location. |
| |
| To put it another way, for any variable x, the coherence order (co) of |
| the stores to x is simply the order in which the stores overwrite one |
| another. The imaginary store which establishes x's initial value |
| comes first in the coherence order; the store which directly |
| overwrites the initial value comes second; the store which overwrites |
| that value comes third, and so on. |
| |
| You can think of the coherence order as being the order in which the |
| stores reach x's location in memory (or if you prefer a more |
| hardware-centric view, the order in which the stores get written to |
| x's cache line). We write W ->co W' if W comes before W' in the |
| coherence order, that is, if the value stored by W gets overwritten, |
| directly or indirectly, by the value stored by W'. |
| |
| Coherence order is required to be consistent with program order. This |
| requirement takes the form of four coherency rules: |
| |
| Write-write coherence: If W ->po-loc W' (i.e., W comes before |
| W' in program order and they access the same location), where W |
| and W' are two stores, then W ->co W'. |
| |
| Write-read coherence: If W ->po-loc R, where W is a store and R |
| is a load, then R must read from W or from some other store |
| which comes after W in the coherence order. |
| |
| Read-write coherence: If R ->po-loc W, where R is a load and W |
| is a store, then the store which R reads from must come before |
| W in the coherence order. |
| |
| Read-read coherence: If R ->po-loc R', where R and R' are two |
| loads, then either they read from the same store or else the |
| store read by R comes before the store read by R' in the |
| coherence order. |
| |
| This is sometimes referred to as sequential consistency per variable, |
| because it means that the accesses to any single memory location obey |
| the rules of the Sequential Consistency memory model. (According to |
| Wikipedia, sequential consistency per variable and cache coherence |
| mean the same thing except that cache coherence includes an extra |
| requirement that every store eventually becomes visible to every CPU.) |
| |
| Any reasonable memory model will include cache coherence. Indeed, our |
| expectation of cache coherence is so deeply ingrained that violations |
| of its requirements look more like hardware bugs than programming |
| errors: |
| |
| int x; |
| |
| P0() |
| { |
| WRITE_ONCE(x, 17); |
| WRITE_ONCE(x, 23); |
| } |
| |
| If the final value stored in x after this code ran was 17, you would |
| think your computer was broken. It would be a violation of the |
| write-write coherence rule: Since the store of 23 comes later in |
| program order, it must also come later in x's coherence order and |
| thus must overwrite the store of 17. |
| |
| int x = 0; |
| |
| P0() |
| { |
| int r1; |
| |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(x, 666); |
| } |
| |
| If r1 = 666 at the end, this would violate the read-write coherence |
| rule: The READ_ONCE() load comes before the WRITE_ONCE() store in |
| program order, so it must not read from that store but rather from one |
| coming earlier in the coherence order (in this case, x's initial |
| value). |
| |
| int x = 0; |
| |
| P0() |
| { |
| WRITE_ONCE(x, 5); |
| } |
| |
| P1() |
| { |
| int r1, r2; |
| |
| r1 = READ_ONCE(x); |
| r2 = READ_ONCE(x); |
| } |
| |
| If r1 = 5 (reading from P0's store) and r2 = 0 (reading from the |
| imaginary store which establishes x's initial value) at the end, this |
| would violate the read-read coherence rule: The r1 load comes before |
| the r2 load in program order, so it must not read from a store that |
| comes later in the coherence order. |
| |
| (As a minor curiosity, if this code had used normal loads instead of |
| READ_ONCE() in P1, on Itanium it sometimes could end up with r1 = 5 |
| and r2 = 0! This results from parallel execution of the operations |
| encoded in Itanium's Very-Long-Instruction-Word format, and it is yet |
| another motivation for using READ_ONCE() when accessing shared memory |
| locations.) |
| |
| Just like the po relation, co is inherently an ordering -- it is not |
| possible for a store to directly or indirectly overwrite itself! And |
| just like with the rf relation, we distinguish between stores that |
| occur on the same CPU (internal coherence order, or coi) and stores |
| that occur on different CPUs (external coherence order, or coe). |
| |
| On the other hand, stores to different memory locations are never |
| related by co, just as instructions on different CPUs are never |
| related by po. Coherence order is strictly per-location, or if you |
| prefer, each location has its own independent coherence order. |
| |
| |
| THE FROM-READS RELATION: fr, fri, and fre |
| ----------------------------------------- |
| |
| The from-reads relation (fr) can be a little difficult for people to |
| grok. It describes the situation where a load reads a value that gets |
| overwritten by a store. In other words, we have R ->fr W when the |
| value that R reads is overwritten (directly or indirectly) by W, or |
| equivalently, when R reads from a store which comes earlier than W in |
| the coherence order. |
| |
| For example: |
| |
| int x = 0; |
| |
| P0() |
| { |
| int r1; |
| |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(x, 2); |
| } |
| |
| The value loaded from x will be 0 (assuming cache coherence!), and it |
| gets overwritten by the value 2. Thus there is an fr link from the |
| READ_ONCE() to the WRITE_ONCE(). If the code contained any later |
| stores to x, there would also be fr links from the READ_ONCE() to |
| them. |
| |
| As with rf, rfi, and rfe, we subdivide the fr relation into fri (when |
| the load and the store are on the same CPU) and fre (when they are on |
| different CPUs). |
| |
| Note that the fr relation is determined entirely by the rf and co |
| relations; it is not independent. Given a read event R and a write |
| event W for the same location, we will have R ->fr W if and only if |
| the write which R reads from is co-before W. In symbols, |
| |
| (R ->fr W) := (there exists W' with W' ->rf R and W' ->co W). |
| |
| |
| AN OPERATIONAL MODEL |
| -------------------- |
| |
| The LKMM is based on various operational memory models, meaning that |
| the models arise from an abstract view of how a computer system |
| operates. Here are the main ideas, as incorporated into the LKMM. |
| |
| The system as a whole is divided into the CPUs and a memory subsystem. |
| The CPUs are responsible for executing instructions (not necessarily |
| in program order), and they communicate with the memory subsystem. |
| For the most part, executing an instruction requires a CPU to perform |
| only internal operations. However, loads, stores, and fences involve |
| more. |
| |
| When CPU C executes a store instruction, it tells the memory subsystem |
| to store a certain value at a certain location. The memory subsystem |
| propagates the store to all the other CPUs as well as to RAM. (As a |
| special case, we say that the store propagates to its own CPU at the |
| time it is executed.) The memory subsystem also determines where the |
| store falls in the location's coherence order. In particular, it must |
| arrange for the store to be co-later than (i.e., to overwrite) any |
| other store to the same location which has already propagated to CPU C. |
| |
| When a CPU executes a load instruction R, it first checks to see |
| whether there are any as-yet unexecuted store instructions, for the |
| same location, that come before R in program order. If there are, it |
| uses the value of the po-latest such store as the value obtained by R, |
| and we say that the store's value is forwarded to R. Otherwise, the |
| CPU asks the memory subsystem for the value to load and we say that R |
| is satisfied from memory. The memory subsystem hands back the value |
| of the co-latest store to the location in question which has already |
| propagated to that CPU. |
| |
| (In fact, the picture needs to be a little more complicated than this. |
| CPUs have local caches, and propagating a store to a CPU really means |
| propagating it to the CPU's local cache. A local cache can take some |
| time to process the stores that it receives, and a store can't be used |
| to satisfy one of the CPU's loads until it has been processed. On |
| most architectures, the local caches process stores in |
| First-In-First-Out order, and consequently the processing delay |
| doesn't matter for the memory model. But on Alpha, the local caches |
| have a partitioned design that results in non-FIFO behavior. We will |
| discuss this in more detail later.) |
| |
| Note that load instructions may be executed speculatively and may be |
| restarted under certain circumstances. The memory model ignores these |
| premature executions; we simply say that the load executes at the |
| final time it is forwarded or satisfied. |
| |
| Executing a fence (or memory barrier) instruction doesn't require a |
| CPU to do anything special other than informing the memory subsystem |
| about the fence. However, fences do constrain the way CPUs and the |
| memory subsystem handle other instructions, in two respects. |
| |
| First, a fence forces the CPU to execute various instructions in |
| program order. Exactly which instructions are ordered depends on the |
| type of fence: |
| |
| Strong fences, including smp_mb() and synchronize_rcu(), force |
| the CPU to execute all po-earlier instructions before any |
| po-later instructions; |
| |
| smp_rmb() forces the CPU to execute all po-earlier loads |
| before any po-later loads; |
| |
| smp_wmb() forces the CPU to execute all po-earlier stores |
| before any po-later stores; |
| |
| Acquire fences, such as smp_load_acquire(), force the CPU to |
| execute the load associated with the fence (e.g., the load |
| part of an smp_load_acquire()) before any po-later |
| instructions; |
| |
| Release fences, such as smp_store_release(), force the CPU to |
| execute all po-earlier instructions before the store |
| associated with the fence (e.g., the store part of an |
| smp_store_release()). |
| |
| Second, some types of fence affect the way the memory subsystem |
| propagates stores. When a fence instruction is executed on CPU C: |
| |
| For each other CPU C', smp_wmb() forces all po-earlier stores |
| on C to propagate to C' before any po-later stores do. |
| |
| For each other CPU C', any store which propagates to C before |
| a release fence is executed (including all po-earlier |
| stores executed on C) is forced to propagate to C' before the |
| store associated with the release fence does. |
| |
| Any store which propagates to C before a strong fence is |
| executed (including all po-earlier stores on C) is forced to |
| propagate to all other CPUs before any instructions po-after |
| the strong fence are executed on C. |
| |
| The propagation ordering enforced by release fences and strong fences |
| affects stores from other CPUs that propagate to CPU C before the |
| fence is executed, as well as stores that are executed on C before the |
| fence. We describe this property by saying that release fences and |
| strong fences are A-cumulative. By contrast, smp_wmb() fences are not |
| A-cumulative; they only affect the propagation of stores that are |
| executed on C before the fence (i.e., those which precede the fence in |
| program order). |
| |
| rcu_read_lock(), rcu_read_unlock(), and synchronize_rcu() fences have |
| other properties which we discuss later. |
| |
| |
| PROPAGATION ORDER RELATION: cumul-fence |
| --------------------------------------- |
| |
| The fences which affect propagation order (i.e., strong, release, and |
| smp_wmb() fences) are collectively referred to as cumul-fences, even |
| though smp_wmb() isn't A-cumulative. The cumul-fence relation is |
| defined to link memory access events E and F whenever: |
| |
| E and F are both stores on the same CPU and an smp_wmb() fence |
| event occurs between them in program order; or |
| |
| F is a release fence and some X comes before F in program order, |
| where either X = E or else E ->rf X; or |
| |
| A strong fence event occurs between some X and F in program |
| order, where either X = E or else E ->rf X. |
| |
| The operational model requires that whenever W and W' are both stores |
| and W ->cumul-fence W', then W must propagate to any given CPU |
| before W' does. However, for different CPUs C and C', it does not |
| require W to propagate to C before W' propagates to C'. |
| |
| |
| DERIVATION OF THE LKMM FROM THE OPERATIONAL MODEL |
| ------------------------------------------------- |
| |
| The LKMM is derived from the restrictions imposed by the design |
| outlined above. These restrictions involve the necessity of |
| maintaining cache coherence and the fact that a CPU can't operate on a |
| value before it knows what that value is, among other things. |
| |
| The formal version of the LKMM is defined by six requirements, or |
| axioms: |
| |
| Sequential consistency per variable: This requires that the |
| system obey the four coherency rules. |
| |
| Atomicity: This requires that atomic read-modify-write |
| operations really are atomic, that is, no other stores can |
| sneak into the middle of such an update. |
| |
| Happens-before: This requires that certain instructions are |
| executed in a specific order. |
| |
| Propagation: This requires that certain stores propagate to |
| CPUs and to RAM in a specific order. |
| |
| Rcu: This requires that RCU read-side critical sections and |
| grace periods obey the rules of RCU, in particular, the |
| Grace-Period Guarantee. |
| |
| Plain-coherence: This requires that plain memory accesses |
| (those not using READ_ONCE(), WRITE_ONCE(), etc.) must obey |
| the operational model's rules regarding cache coherence. |
| |
| The first and second are quite common; they can be found in many |
| memory models (such as those for C11/C++11). The "happens-before" and |
| "propagation" axioms have analogs in other memory models as well. The |
| "rcu" and "plain-coherence" axioms are specific to the LKMM. |
| |
| Each of these axioms is discussed below. |
| |
| |
| SEQUENTIAL CONSISTENCY PER VARIABLE |
| ----------------------------------- |
| |
| According to the principle of cache coherence, the stores to any fixed |
| shared location in memory form a global ordering. We can imagine |
| inserting the loads from that location into this ordering, by placing |
| each load between the store that it reads from and the following |
| store. This leaves the relative positions of loads that read from the |
| same store unspecified; let's say they are inserted in program order, |
| first for CPU 0, then CPU 1, etc. |
| |
| You can check that the four coherency rules imply that the rf, co, fr, |
| and po-loc relations agree with this global ordering; in other words, |
| whenever we have X ->rf Y or X ->co Y or X ->fr Y or X ->po-loc Y, the |
| X event comes before the Y event in the global ordering. The LKMM's |
| "coherence" axiom expresses this by requiring the union of these |
| relations not to have any cycles. This means it must not be possible |
| to find events |
| |
| X0 -> X1 -> X2 -> ... -> Xn -> X0, |
| |
| where each of the links is either rf, co, fr, or po-loc. This has to |
| hold if the accesses to the fixed memory location can be ordered as |
| cache coherence demands. |
| |
| Although it is not obvious, it can be shown that the converse is also |
| true: This LKMM axiom implies that the four coherency rules are |
| obeyed. |
| |
| |
| ATOMIC UPDATES: rmw |
| ------------------- |
| |
| What does it mean to say that a read-modify-write (rmw) update, such |
| as atomic_inc(&x), is atomic? It means that the memory location (x in |
| this case) does not get altered between the read and the write events |
| making up the atomic operation. In particular, if two CPUs perform |
| atomic_inc(&x) concurrently, it must be guaranteed that the final |
| value of x will be the initial value plus two. We should never have |
| the following sequence of events: |
| |
| CPU 0 loads x obtaining 13; |
| CPU 1 loads x obtaining 13; |
| CPU 0 stores 14 to x; |
| CPU 1 stores 14 to x; |
| |
| where the final value of x is wrong (14 rather than 15). |
| |
| In this example, CPU 0's increment effectively gets lost because it |
| occurs in between CPU 1's load and store. To put it another way, the |
| problem is that the position of CPU 0's store in x's coherence order |
| is between the store that CPU 1 reads from and the store that CPU 1 |
| performs. |
| |
| The same analysis applies to all atomic update operations. Therefore, |
| to enforce atomicity the LKMM requires that atomic updates follow this |
| rule: Whenever R and W are the read and write events composing an |
| atomic read-modify-write and W' is the write event which R reads from, |
| there must not be any stores coming between W' and W in the coherence |
| order. Equivalently, |
| |
| (R ->rmw W) implies (there is no X with R ->fr X and X ->co W), |
| |
| where the rmw relation links the read and write events making up each |
| atomic update. This is what the LKMM's "atomic" axiom says. |
| |
| Atomic rmw updates play one more role in the LKMM: They can form "rmw |
| sequences". An rmw sequence is simply a bunch of atomic updates where |
| each update reads from the previous one. Written using events, it |
| looks like this: |
| |
| Z0 ->rf Y1 ->rmw Z1 ->rf ... ->rf Yn ->rmw Zn, |
| |
| where Z0 is some store event and n can be any number (even 0, in the |
| degenerate case). We write this relation as: Z0 ->rmw-sequence Zn. |
| Note that this implies Z0 and Zn are stores to the same variable. |
| |
| Rmw sequences have a special property in the LKMM: They can extend the |
| cumul-fence relation. That is, if we have: |
| |
| U ->cumul-fence X -> rmw-sequence Y |
| |
| then also U ->cumul-fence Y. Thinking about this in terms of the |
| operational model, U ->cumul-fence X says that the store U propagates |
| to each CPU before the store X does. Then the fact that X and Y are |
| linked by an rmw sequence means that U also propagates to each CPU |
| before Y does. In an analogous way, rmw sequences can also extend |
| the w-post-bounded relation defined below in the PLAIN ACCESSES AND |
| DATA RACES section. |
| |
| (The notion of rmw sequences in the LKMM is similar to, but not quite |
| the same as, that of release sequences in the C11 memory model. They |
| were added to the LKMM to fix an obscure bug; without them, atomic |
| updates with full-barrier semantics did not always guarantee ordering |
| at least as strong as atomic updates with release-barrier semantics.) |
| |
| |
| THE PRESERVED PROGRAM ORDER RELATION: ppo |
| ----------------------------------------- |
| |
| There are many situations where a CPU is obliged to execute two |
| instructions in program order. We amalgamate them into the ppo (for |
| "preserved program order") relation, which links the po-earlier |
| instruction to the po-later instruction and is thus a sub-relation of |
| po. |
| |
| The operational model already includes a description of one such |
| situation: Fences are a source of ppo links. Suppose X and Y are |
| memory accesses with X ->po Y; then the CPU must execute X before Y if |
| any of the following hold: |
| |
| A strong (smp_mb() or synchronize_rcu()) fence occurs between |
| X and Y; |
| |
| X and Y are both stores and an smp_wmb() fence occurs between |
| them; |
| |
| X and Y are both loads and an smp_rmb() fence occurs between |
| them; |
| |
| X is also an acquire fence, such as smp_load_acquire(); |
| |
| Y is also a release fence, such as smp_store_release(). |
| |
| Another possibility, not mentioned earlier but discussed in the next |
| section, is: |
| |
| X and Y are both loads, X ->addr Y (i.e., there is an address |
| dependency from X to Y), and X is a READ_ONCE() or an atomic |
| access. |
| |
| Dependencies can also cause instructions to be executed in program |
| order. This is uncontroversial when the second instruction is a |
| store; either a data, address, or control dependency from a load R to |
| a store W will force the CPU to execute R before W. This is very |
| simply because the CPU cannot tell the memory subsystem about W's |
| store before it knows what value should be stored (in the case of a |
| data dependency), what location it should be stored into (in the case |
| of an address dependency), or whether the store should actually take |
| place (in the case of a control dependency). |
| |
| Dependencies to load instructions are more problematic. To begin with, |
| there is no such thing as a data dependency to a load. Next, a CPU |
| has no reason to respect a control dependency to a load, because it |
| can always satisfy the second load speculatively before the first, and |
| then ignore the result if it turns out that the second load shouldn't |
| be executed after all. And lastly, the real difficulties begin when |
| we consider address dependencies to loads. |
| |
| To be fair about it, all Linux-supported architectures do execute |
| loads in program order if there is an address dependency between them. |
| After all, a CPU cannot ask the memory subsystem to load a value from |
| a particular location before it knows what that location is. However, |
| the split-cache design used by Alpha can cause it to behave in a way |
| that looks as if the loads were executed out of order (see the next |
| section for more details). The kernel includes a workaround for this |
| problem when the loads come from READ_ONCE(), and therefore the LKMM |
| includes address dependencies to loads in the ppo relation. |
| |
| On the other hand, dependencies can indirectly affect the ordering of |
| two loads. This happens when there is a dependency from a load to a |
| store and a second, po-later load reads from that store: |
| |
| R ->dep W ->rfi R', |
| |
| where the dep link can be either an address or a data dependency. In |
| this situation we know it is possible for the CPU to execute R' before |
| W, because it can forward the value that W will store to R'. But it |
| cannot execute R' before R, because it cannot forward the value before |
| it knows what that value is, or that W and R' do access the same |
| location. However, if there is merely a control dependency between R |
| and W then the CPU can speculatively forward W to R' before executing |
| R; if the speculation turns out to be wrong then the CPU merely has to |
| restart or abandon R'. |
| |
| (In theory, a CPU might forward a store to a load when it runs across |
| an address dependency like this: |
| |
| r1 = READ_ONCE(ptr); |
| WRITE_ONCE(*r1, 17); |
| r2 = READ_ONCE(*r1); |
| |
| because it could tell that the store and the second load access the |
| same location even before it knows what the location's address is. |
| However, none of the architectures supported by the Linux kernel do |
| this.) |
| |
| Two memory accesses of the same location must always be executed in |
| program order if the second access is a store. Thus, if we have |
| |
| R ->po-loc W |
| |
| (the po-loc link says that R comes before W in program order and they |
| access the same location), the CPU is obliged to execute W after R. |
| If it executed W first then the memory subsystem would respond to R's |
| read request with the value stored by W (or an even later store), in |
| violation of the read-write coherence rule. Similarly, if we had |
| |
| W ->po-loc W' |
| |
| and the CPU executed W' before W, then the memory subsystem would put |
| W' before W in the coherence order. It would effectively cause W to |
| overwrite W', in violation of the write-write coherence rule. |
| (Interestingly, an early ARMv8 memory model, now obsolete, proposed |
| allowing out-of-order writes like this to occur. The model avoided |
| violating the write-write coherence rule by requiring the CPU not to |
| send the W write to the memory subsystem at all!) |
| |
| |
| AND THEN THERE WAS ALPHA |
| ------------------------ |
| |
| As mentioned above, the Alpha architecture is unique in that it does |
| not appear to respect address dependencies to loads. This means that |
| code such as the following: |
| |
| int x = 0; |
| int y = -1; |
| int *ptr = &y; |
| |
| P0() |
| { |
| WRITE_ONCE(x, 1); |
| smp_wmb(); |
| WRITE_ONCE(ptr, &x); |
| } |
| |
| P1() |
| { |
| int *r1; |
| int r2; |
| |
| r1 = ptr; |
| r2 = READ_ONCE(*r1); |
| } |
| |
| can malfunction on Alpha systems (notice that P1 uses an ordinary load |
| to read ptr instead of READ_ONCE()). It is quite possible that r1 = &x |
| and r2 = 0 at the end, in spite of the address dependency. |
| |
| At first glance this doesn't seem to make sense. We know that the |
| smp_wmb() forces P0's store to x to propagate to P1 before the store |
| to ptr does. And since P1 can't execute its second load |
| until it knows what location to load from, i.e., after executing its |
| first load, the value x = 1 must have propagated to P1 before the |
| second load executed. So why doesn't r2 end up equal to 1? |
| |
| The answer lies in the Alpha's split local caches. Although the two |
| stores do reach P1's local cache in the proper order, it can happen |
| that the first store is processed by a busy part of the cache while |
| the second store is processed by an idle part. As a result, the x = 1 |
| value may not become available for P1's CPU to read until after the |
| ptr = &x value does, leading to the undesirable result above. The |
| final effect is that even though the two loads really are executed in |
| program order, it appears that they aren't. |
| |
| This could not have happened if the local cache had processed the |
| incoming stores in FIFO order. By contrast, other architectures |
| maintain at least the appearance of FIFO order. |
| |
| In practice, this difficulty is solved by inserting a special fence |
| between P1's two loads when the kernel is compiled for the Alpha |
| architecture. In fact, as of version 4.15, the kernel automatically |
| adds this fence after every READ_ONCE() and atomic load on Alpha. The |
| effect of the fence is to cause the CPU not to execute any po-later |
| instructions until after the local cache has finished processing all |
| the stores it has already received. Thus, if the code was changed to: |
| |
| P1() |
| { |
| int *r1; |
| int r2; |
| |
| r1 = READ_ONCE(ptr); |
| r2 = READ_ONCE(*r1); |
| } |
| |
| then we would never get r1 = &x and r2 = 0. By the time P1 executed |
| its second load, the x = 1 store would already be fully processed by |
| the local cache and available for satisfying the read request. Thus |
| we have yet another reason why shared data should always be read with |
| READ_ONCE() or another synchronization primitive rather than accessed |
| directly. |
| |
| The LKMM requires that smp_rmb(), acquire fences, and strong fences |
| share this property: They do not allow the CPU to execute any po-later |
| instructions (or po-later loads in the case of smp_rmb()) until all |
| outstanding stores have been processed by the local cache. In the |
| case of a strong fence, the CPU first has to wait for all of its |
| po-earlier stores to propagate to every other CPU in the system; then |
| it has to wait for the local cache to process all the stores received |
| as of that time -- not just the stores received when the strong fence |
| began. |
| |
| And of course, none of this matters for any architecture other than |
| Alpha. |
| |
| |
| THE HAPPENS-BEFORE RELATION: hb |
| ------------------------------- |
| |
| The happens-before relation (hb) links memory accesses that have to |
| execute in a certain order. hb includes the ppo relation and two |
| others, one of which is rfe. |
| |
| W ->rfe R implies that W and R are on different CPUs. It also means |
| that W's store must have propagated to R's CPU before R executed; |
| otherwise R could not have read the value stored by W. Therefore W |
| must have executed before R, and so we have W ->hb R. |
| |
| The equivalent fact need not hold if W ->rfi R (i.e., W and R are on |
| the same CPU). As we have already seen, the operational model allows |
| W's value to be forwarded to R in such cases, meaning that R may well |
| execute before W does. |
| |
| It's important to understand that neither coe nor fre is included in |
| hb, despite their similarities to rfe. For example, suppose we have |
| W ->coe W'. This means that W and W' are stores to the same location, |
| they execute on different CPUs, and W comes before W' in the coherence |
| order (i.e., W' overwrites W). Nevertheless, it is possible for W' to |
| execute before W, because the decision as to which store overwrites |
| the other is made later by the memory subsystem. When the stores are |
| nearly simultaneous, either one can come out on top. Similarly, |
| R ->fre W means that W overwrites the value which R reads, but it |
| doesn't mean that W has to execute after R. All that's necessary is |
| for the memory subsystem not to propagate W to R's CPU until after R |
| has executed, which is possible if W executes shortly before R. |
| |
| The third relation included in hb is like ppo, in that it only links |
| events that are on the same CPU. However it is more difficult to |
| explain, because it arises only indirectly from the requirement of |
| cache coherence. The relation is called prop, and it links two events |
| on CPU C in situations where a store from some other CPU comes after |
| the first event in the coherence order and propagates to C before the |
| second event executes. |
| |
| This is best explained with some examples. The simplest case looks |
| like this: |
| |
| int x; |
| |
| P0() |
| { |
| int r1; |
| |
| WRITE_ONCE(x, 1); |
| r1 = READ_ONCE(x); |
| } |
| |
| P1() |
| { |
| WRITE_ONCE(x, 8); |
| } |
| |
| If r1 = 8 at the end then P0's accesses must have executed in program |
| order. We can deduce this from the operational model; if P0's load |
| had executed before its store then the value of the store would have |
| been forwarded to the load, so r1 would have ended up equal to 1, not |
| 8. In this case there is a prop link from P0's write event to its read |
| event, because P1's store came after P0's store in x's coherence |
| order, and P1's store propagated to P0 before P0's load executed. |
| |
| An equally simple case involves two loads of the same location that |
| read from different stores: |
| |
| int x = 0; |
| |
| P0() |
| { |
| int r1, r2; |
| |
| r1 = READ_ONCE(x); |
| r2 = READ_ONCE(x); |
| } |
| |
| P1() |
| { |
| WRITE_ONCE(x, 9); |
| } |
| |
| If r1 = 0 and r2 = 9 at the end then P0's accesses must have executed |
| in program order. If the second load had executed before the first |
| then the x = 9 store must have been propagated to P0 before the first |
| load executed, and so r1 would have been 9 rather than 0. In this |
| case there is a prop link from P0's first read event to its second, |
| because P1's store overwrote the value read by P0's first load, and |
| P1's store propagated to P0 before P0's second load executed. |
| |
| Less trivial examples of prop all involve fences. Unlike the simple |
| examples above, they can require that some instructions are executed |
| out of program order. This next one should look familiar: |
| |
| int buf = 0, flag = 0; |
| |
| P0() |
| { |
| WRITE_ONCE(buf, 1); |
| smp_wmb(); |
| WRITE_ONCE(flag, 1); |
| } |
| |
| P1() |
| { |
| int r1; |
| int r2; |
| |
| r1 = READ_ONCE(flag); |
| r2 = READ_ONCE(buf); |
| } |
| |
| This is the MP pattern again, with an smp_wmb() fence between the two |
| stores. If r1 = 1 and r2 = 0 at the end then there is a prop link |
| from P1's second load to its first (backwards!). The reason is |
| similar to the previous examples: The value P1 loads from buf gets |
| overwritten by P0's store to buf, the fence guarantees that the store |
| to buf will propagate to P1 before the store to flag does, and the |
| store to flag propagates to P1 before P1 reads flag. |
| |
| The prop link says that in order to obtain the r1 = 1, r2 = 0 result, |
| P1 must execute its second load before the first. Indeed, if the load |
| from flag were executed first, then the buf = 1 store would already |
| have propagated to P1 by the time P1's load from buf executed, so r2 |
| would have been 1 at the end, not 0. (The reasoning holds even for |
| Alpha, although the details are more complicated and we will not go |
| into them.) |
| |
| But what if we put an smp_rmb() fence between P1's loads? The fence |
| would force the two loads to be executed in program order, and it |
| would generate a cycle in the hb relation: The fence would create a ppo |
| link (hence an hb link) from the first load to the second, and the |
| prop relation would give an hb link from the second load to the first. |
| Since an instruction can't execute before itself, we are forced to |
| conclude that if an smp_rmb() fence is added, the r1 = 1, r2 = 0 |
| outcome is impossible -- as it should be. |
| |
| The formal definition of the prop relation involves a coe or fre link, |
| followed by an arbitrary number of cumul-fence links, ending with an |
| rfe link. You can concoct more exotic examples, containing more than |
| one fence, although this quickly leads to diminishing returns in terms |
| of complexity. For instance, here's an example containing a coe link |
| followed by two cumul-fences and an rfe link, utilizing the fact that |
| release fences are A-cumulative: |
| |
| int x, y, z; |
| |
| P0() |
| { |
| int r0; |
| |
| WRITE_ONCE(x, 1); |
| r0 = READ_ONCE(z); |
| } |
| |
| P1() |
| { |
| WRITE_ONCE(x, 2); |
| smp_wmb(); |
| WRITE_ONCE(y, 1); |
| } |
| |
| P2() |
| { |
| int r2; |
| |
| r2 = READ_ONCE(y); |
| smp_store_release(&z, 1); |
| } |
| |
| If x = 2, r0 = 1, and r2 = 1 after this code runs then there is a prop |
| link from P0's store to its load. This is because P0's store gets |
| overwritten by P1's store since x = 2 at the end (a coe link), the |
| smp_wmb() ensures that P1's store to x propagates to P2 before the |
| store to y does (the first cumul-fence), the store to y propagates to P2 |
| before P2's load and store execute, P2's smp_store_release() |
| guarantees that the stores to x and y both propagate to P0 before the |
| store to z does (the second cumul-fence), and P0's load executes after the |
| store to z has propagated to P0 (an rfe link). |
| |
| In summary, the fact that the hb relation links memory access events |
| in the order they execute means that it must not have cycles. This |
| requirement is the content of the LKMM's "happens-before" axiom. |
| |
| The LKMM defines yet another relation connected to times of |
| instruction execution, but it is not included in hb. It relies on the |
| particular properties of strong fences, which we cover in the next |
| section. |
| |
| |
| THE PROPAGATES-BEFORE RELATION: pb |
| ---------------------------------- |
| |
| The propagates-before (pb) relation capitalizes on the special |
| features of strong fences. It links two events E and F whenever some |
| store is coherence-later than E and propagates to every CPU and to RAM |
| before F executes. The formal definition requires that E be linked to |
| F via a coe or fre link, an arbitrary number of cumul-fences, an |
| optional rfe link, a strong fence, and an arbitrary number of hb |
| links. Let's see how this definition works out. |
| |
| Consider first the case where E is a store (implying that the sequence |
| of links begins with coe). Then there are events W, X, Y, and Z such |
| that: |
| |
| E ->coe W ->cumul-fence* X ->rfe? Y ->strong-fence Z ->hb* F, |
| |
| where the * suffix indicates an arbitrary number of links of the |
| specified type, and the ? suffix indicates the link is optional (Y may |
| be equal to X). Because of the cumul-fence links, we know that W will |
| propagate to Y's CPU before X does, hence before Y executes and hence |
| before the strong fence executes. Because this fence is strong, we |
| know that W will propagate to every CPU and to RAM before Z executes. |
| And because of the hb links, we know that Z will execute before F. |
| Thus W, which comes later than E in the coherence order, will |
| propagate to every CPU and to RAM before F executes. |
| |
| The case where E is a load is exactly the same, except that the first |
| link in the sequence is fre instead of coe. |
| |
| The existence of a pb link from E to F implies that E must execute |
| before F. To see why, suppose that F executed first. Then W would |
| have propagated to E's CPU before E executed. If E was a store, the |
| memory subsystem would then be forced to make E come after W in the |
| coherence order, contradicting the fact that E ->coe W. If E was a |
| load, the memory subsystem would then be forced to satisfy E's read |
| request with the value stored by W or an even later store, |
| contradicting the fact that E ->fre W. |
| |
| A good example illustrating how pb works is the SB pattern with strong |
| fences: |
| |
| int x = 0, y = 0; |
| |
| P0() |
| { |
| int r0; |
| |
| WRITE_ONCE(x, 1); |
| smp_mb(); |
| r0 = READ_ONCE(y); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| WRITE_ONCE(y, 1); |
| smp_mb(); |
| r1 = READ_ONCE(x); |
| } |
| |
| If r0 = 0 at the end then there is a pb link from P0's load to P1's |
| load: an fre link from P0's load to P1's store (which overwrites the |
| value read by P0), and a strong fence between P1's store and its load. |
| In this example, the sequences of cumul-fence and hb links are empty. |
| Note that this pb link is not included in hb as an instance of prop, |
| because it does not start and end on the same CPU. |
| |
| Similarly, if r1 = 0 at the end then there is a pb link from P1's load |
| to P0's. This means that if both r1 and r2 were 0 there would be a |
| cycle in pb, which is not possible since an instruction cannot execute |
| before itself. Thus, adding smp_mb() fences to the SB pattern |
| prevents the r0 = 0, r1 = 0 outcome. |
| |
| In summary, the fact that the pb relation links events in the order |
| they execute means that it cannot have cycles. This requirement is |
| the content of the LKMM's "propagation" axiom. |
| |
| |
| RCU RELATIONS: rcu-link, rcu-gp, rcu-rscsi, rcu-order, rcu-fence, and rb |
| ------------------------------------------------------------------------ |
| |
| RCU (Read-Copy-Update) is a powerful synchronization mechanism. It |
| rests on two concepts: grace periods and read-side critical sections. |
| |
| A grace period is the span of time occupied by a call to |
| synchronize_rcu(). A read-side critical section (or just critical |
| section, for short) is a region of code delimited by rcu_read_lock() |
| at the start and rcu_read_unlock() at the end. Critical sections can |
| be nested, although we won't make use of this fact. |
| |
| As far as memory models are concerned, RCU's main feature is its |
| Grace-Period Guarantee, which states that a critical section can never |
| span a full grace period. In more detail, the Guarantee says: |
| |
| For any critical section C and any grace period G, at least |
| one of the following statements must hold: |
| |
| (1) C ends before G does, and in addition, every store that |
| propagates to C's CPU before the end of C must propagate to |
| every CPU before G ends. |
| |
| (2) G starts before C does, and in addition, every store that |
| propagates to G's CPU before the start of G must propagate |
| to every CPU before C starts. |
| |
| In particular, it is not possible for a critical section to both start |
| before and end after a grace period. |
| |
| Here is a simple example of RCU in action: |
| |
| int x, y; |
| |
| P0() |
| { |
| rcu_read_lock(); |
| WRITE_ONCE(x, 1); |
| WRITE_ONCE(y, 1); |
| rcu_read_unlock(); |
| } |
| |
| P1() |
| { |
| int r1, r2; |
| |
| r1 = READ_ONCE(x); |
| synchronize_rcu(); |
| r2 = READ_ONCE(y); |
| } |
| |
| The Grace Period Guarantee tells us that when this code runs, it will |
| never end with r1 = 1 and r2 = 0. The reasoning is as follows. r1 = 1 |
| means that P0's store to x propagated to P1 before P1 called |
| synchronize_rcu(), so P0's critical section must have started before |
| P1's grace period, contrary to part (2) of the Guarantee. On the |
| other hand, r2 = 0 means that P0's store to y, which occurs before the |
| end of the critical section, did not propagate to P1 before the end of |
| the grace period, contrary to part (1). Together the results violate |
| the Guarantee. |
| |
| In the kernel's implementations of RCU, the requirements for stores |
| to propagate to every CPU are fulfilled by placing strong fences at |
| suitable places in the RCU-related code. Thus, if a critical section |
| starts before a grace period does then the critical section's CPU will |
| execute an smp_mb() fence after the end of the critical section and |
| some time before the grace period's synchronize_rcu() call returns. |
| And if a critical section ends after a grace period does then the |
| synchronize_rcu() routine will execute an smp_mb() fence at its start |
| and some time before the critical section's opening rcu_read_lock() |
| executes. |
| |
| What exactly do we mean by saying that a critical section "starts |
| before" or "ends after" a grace period? Some aspects of the meaning |
| are pretty obvious, as in the example above, but the details aren't |
| entirely clear. The LKMM formalizes this notion by means of the |
| rcu-link relation. rcu-link encompasses a very general notion of |
| "before": If E and F are RCU fence events (i.e., rcu_read_lock(), |
| rcu_read_unlock(), or synchronize_rcu()) then among other things, |
| E ->rcu-link F includes cases where E is po-before some memory-access |
| event X, F is po-after some memory-access event Y, and we have any of |
| X ->rfe Y, X ->co Y, or X ->fr Y. |
| |
| The formal definition of the rcu-link relation is more than a little |
| obscure, and we won't give it here. It is closely related to the pb |
| relation, and the details don't matter unless you want to comb through |
| a somewhat lengthy formal proof. Pretty much all you need to know |
| about rcu-link is the information in the preceding paragraph. |
| |
| The LKMM also defines the rcu-gp and rcu-rscsi relations. They bring |
| grace periods and read-side critical sections into the picture, in the |
| following way: |
| |
| E ->rcu-gp F means that E and F are in fact the same event, |
| and that event is a synchronize_rcu() fence (i.e., a grace |
| period). |
| |
| E ->rcu-rscsi F means that E and F are the rcu_read_unlock() |
| and rcu_read_lock() fence events delimiting some read-side |
| critical section. (The 'i' at the end of the name emphasizes |
| that this relation is "inverted": It links the end of the |
| critical section to the start.) |
| |
| If we think of the rcu-link relation as standing for an extended |
| "before", then X ->rcu-gp Y ->rcu-link Z roughly says that X is a |
| grace period which ends before Z begins. (In fact it covers more than |
| this, because it also includes cases where some store propagates to |
| Z's CPU before Z begins but doesn't propagate to some other CPU until |
| after X ends.) Similarly, X ->rcu-rscsi Y ->rcu-link Z says that X is |
| the end of a critical section which starts before Z begins. |
| |
| The LKMM goes on to define the rcu-order relation as a sequence of |
| rcu-gp and rcu-rscsi links separated by rcu-link links, in which the |
| number of rcu-gp links is >= the number of rcu-rscsi links. For |
| example: |
| |
| X ->rcu-gp Y ->rcu-link Z ->rcu-rscsi T ->rcu-link U ->rcu-gp V |
| |
| would imply that X ->rcu-order V, because this sequence contains two |
| rcu-gp links and one rcu-rscsi link. (It also implies that |
| X ->rcu-order T and Z ->rcu-order V.) On the other hand: |
| |
| X ->rcu-rscsi Y ->rcu-link Z ->rcu-rscsi T ->rcu-link U ->rcu-gp V |
| |
| does not imply X ->rcu-order V, because the sequence contains only |
| one rcu-gp link but two rcu-rscsi links. |
| |
| The rcu-order relation is important because the Grace Period Guarantee |
| means that rcu-order links act kind of like strong fences. In |
| particular, E ->rcu-order F implies not only that E begins before F |
| ends, but also that any write po-before E will propagate to every CPU |
| before any instruction po-after F can execute. (However, it does not |
| imply that E must execute before F; in fact, each synchronize_rcu() |
| fence event is linked to itself by rcu-order as a degenerate case.) |
| |
| To prove this in full generality requires some intellectual effort. |
| We'll consider just a very simple case: |
| |
| G ->rcu-gp W ->rcu-link Z ->rcu-rscsi F. |
| |
| This formula means that G and W are the same event (a grace period), |
| and there are events X, Y and a read-side critical section C such that: |
| |
| 1. G = W is po-before or equal to X; |
| |
| 2. X comes "before" Y in some sense (including rfe, co and fr); |
| |
| 3. Y is po-before Z; |
| |
| 4. Z is the rcu_read_unlock() event marking the end of C; |
| |
| 5. F is the rcu_read_lock() event marking the start of C. |
| |
| From 1 - 4 we deduce that the grace period G ends before the critical |
| section C. Then part (2) of the Grace Period Guarantee says not only |
| that G starts before C does, but also that any write which executes on |
| G's CPU before G starts must propagate to every CPU before C starts. |
| In particular, the write propagates to every CPU before F finishes |
| executing and hence before any instruction po-after F can execute. |
| This sort of reasoning can be extended to handle all the situations |
| covered by rcu-order. |
| |
| The rcu-fence relation is a simple extension of rcu-order. While |
| rcu-order only links certain fence events (calls to synchronize_rcu(), |
| rcu_read_lock(), or rcu_read_unlock()), rcu-fence links any events |
| that are separated by an rcu-order link. This is analogous to the way |
| the strong-fence relation links events that are separated by an |
| smp_mb() fence event (as mentioned above, rcu-order links act kind of |
| like strong fences). Written symbolically, X ->rcu-fence Y means |
| there are fence events E and F such that: |
| |
| X ->po E ->rcu-order F ->po Y. |
| |
| From the discussion above, we see this implies not only that X |
| executes before Y, but also (if X is a store) that X propagates to |
| every CPU before Y executes. Thus rcu-fence is sort of a |
| "super-strong" fence: Unlike the original strong fences (smp_mb() and |
| synchronize_rcu()), rcu-fence is able to link events on different |
| CPUs. (Perhaps this fact should lead us to say that rcu-fence isn't |
| really a fence at all!) |
| |
| Finally, the LKMM defines the RCU-before (rb) relation in terms of |
| rcu-fence. This is done in essentially the same way as the pb |
| relation was defined in terms of strong-fence. We will omit the |
| details; the end result is that E ->rb F implies E must execute |
| before F, just as E ->pb F does (and for much the same reasons). |
| |
| Putting this all together, the LKMM expresses the Grace Period |
| Guarantee by requiring that the rb relation does not contain a cycle. |
| Equivalently, this "rcu" axiom requires that there are no events E |
| and F with E ->rcu-link F ->rcu-order E. Or to put it a third way, |
| the axiom requires that there are no cycles consisting of rcu-gp and |
| rcu-rscsi alternating with rcu-link, where the number of rcu-gp links |
| is >= the number of rcu-rscsi links. |
| |
| Justifying the axiom isn't easy, but it is in fact a valid |
| formalization of the Grace Period Guarantee. We won't attempt to go |
| through the detailed argument, but the following analysis gives a |
| taste of what is involved. Suppose both parts of the Guarantee are |
| violated: A critical section starts before a grace period, and some |
| store propagates to the critical section's CPU before the end of the |
| critical section but doesn't propagate to some other CPU until after |
| the end of the grace period. |
| |
| Putting symbols to these ideas, let L and U be the rcu_read_lock() and |
| rcu_read_unlock() fence events delimiting the critical section in |
| question, and let S be the synchronize_rcu() fence event for the grace |
| period. Saying that the critical section starts before S means there |
| are events Q and R where Q is po-after L (which marks the start of the |
| critical section), Q is "before" R in the sense used by the rcu-link |
| relation, and R is po-before the grace period S. Thus we have: |
| |
| L ->rcu-link S. |
| |
| Let W be the store mentioned above, let Y come before the end of the |
| critical section and witness that W propagates to the critical |
| section's CPU by reading from W, and let Z on some arbitrary CPU be a |
| witness that W has not propagated to that CPU, where Z happens after |
| some event X which is po-after S. Symbolically, this amounts to: |
| |
| S ->po X ->hb* Z ->fr W ->rf Y ->po U. |
| |
| The fr link from Z to W indicates that W has not propagated to Z's CPU |
| at the time that Z executes. From this, it can be shown (see the |
| discussion of the rcu-link relation earlier) that S and U are related |
| by rcu-link: |
| |
| S ->rcu-link U. |
| |
| Since S is a grace period we have S ->rcu-gp S, and since L and U are |
| the start and end of the critical section C we have U ->rcu-rscsi L. |
| From this we obtain: |
| |
| S ->rcu-gp S ->rcu-link U ->rcu-rscsi L ->rcu-link S, |
| |
| a forbidden cycle. Thus the "rcu" axiom rules out this violation of |
| the Grace Period Guarantee. |
| |
| For something a little more down-to-earth, let's see how the axiom |
| works out in practice. Consider the RCU code example from above, this |
| time with statement labels added: |
| |
| int x, y; |
| |
| P0() |
| { |
| L: rcu_read_lock(); |
| X: WRITE_ONCE(x, 1); |
| Y: WRITE_ONCE(y, 1); |
| U: rcu_read_unlock(); |
| } |
| |
| P1() |
| { |
| int r1, r2; |
| |
| Z: r1 = READ_ONCE(x); |
| S: synchronize_rcu(); |
| W: r2 = READ_ONCE(y); |
| } |
| |
| |
| If r2 = 0 at the end then P0's store at Y overwrites the value that |
| P1's load at W reads from, so we have W ->fre Y. Since S ->po W and |
| also Y ->po U, we get S ->rcu-link U. In addition, S ->rcu-gp S |
| because S is a grace period. |
| |
| If r1 = 1 at the end then P1's load at Z reads from P0's store at X, |
| so we have X ->rfe Z. Together with L ->po X and Z ->po S, this |
| yields L ->rcu-link S. And since L and U are the start and end of a |
| critical section, we have U ->rcu-rscsi L. |
| |
| Then U ->rcu-rscsi L ->rcu-link S ->rcu-gp S ->rcu-link U is a |
| forbidden cycle, violating the "rcu" axiom. Hence the outcome is not |
| allowed by the LKMM, as we would expect. |
| |
| For contrast, let's see what can happen in a more complicated example: |
| |
| int x, y, z; |
| |
| P0() |
| { |
| int r0; |
| |
| L0: rcu_read_lock(); |
| r0 = READ_ONCE(x); |
| WRITE_ONCE(y, 1); |
| U0: rcu_read_unlock(); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| r1 = READ_ONCE(y); |
| S1: synchronize_rcu(); |
| WRITE_ONCE(z, 1); |
| } |
| |
| P2() |
| { |
| int r2; |
| |
| L2: rcu_read_lock(); |
| r2 = READ_ONCE(z); |
| WRITE_ONCE(x, 1); |
| U2: rcu_read_unlock(); |
| } |
| |
| If r0 = r1 = r2 = 1 at the end, then similar reasoning to before shows |
| that U0 ->rcu-rscsi L0 ->rcu-link S1 ->rcu-gp S1 ->rcu-link U2 ->rcu-rscsi |
| L2 ->rcu-link U0. However this cycle is not forbidden, because the |
| sequence of relations contains fewer instances of rcu-gp (one) than of |
| rcu-rscsi (two). Consequently the outcome is allowed by the LKMM. |
| The following instruction timing diagram shows how it might actually |
| occur: |
| |
| P0 P1 P2 |
| -------------------- -------------------- -------------------- |
| rcu_read_lock() |
| WRITE_ONCE(y, 1) |
| r1 = READ_ONCE(y) |
| synchronize_rcu() starts |
| . rcu_read_lock() |
| . WRITE_ONCE(x, 1) |
| r0 = READ_ONCE(x) . |
| rcu_read_unlock() . |
| synchronize_rcu() ends |
| WRITE_ONCE(z, 1) |
| r2 = READ_ONCE(z) |
| rcu_read_unlock() |
| |
| This requires P0 and P2 to execute their loads and stores out of |
| program order, but of course they are allowed to do so. And as you |
| can see, the Grace Period Guarantee is not violated: The critical |
| section in P0 both starts before P1's grace period does and ends |
| before it does, and the critical section in P2 both starts after P1's |
| grace period does and ends after it does. |
| |
| Addendum: The LKMM now supports SRCU (Sleepable Read-Copy-Update) in |
| addition to normal RCU. The ideas involved are much the same as |
| above, with new relations srcu-gp and srcu-rscsi added to represent |
| SRCU grace periods and read-side critical sections. There is a |
| restriction on the srcu-gp and srcu-rscsi links that can appear in an |
| rcu-order sequence (the srcu-rscsi links must be paired with srcu-gp |
| links having the same SRCU domain with proper nesting); the details |
| are relatively unimportant. |
| |
| |
| LOCKING |
| ------- |
| |
| The LKMM includes locking. In fact, there is special code for locking |
| in the formal model, added in order to make tools run faster. |
| However, this special code is intended to be more or less equivalent |
| to concepts we have already covered. A spinlock_t variable is treated |
| the same as an int, and spin_lock(&s) is treated almost the same as: |
| |
| while (cmpxchg_acquire(&s, 0, 1) != 0) |
| cpu_relax(); |
| |
| This waits until s is equal to 0 and then atomically sets it to 1, |
| and the read part of the cmpxchg operation acts as an acquire fence. |
| An alternate way to express the same thing would be: |
| |
| r = xchg_acquire(&s, 1); |
| |
| along with a requirement that at the end, r = 0. Similarly, |
| spin_trylock(&s) is treated almost the same as: |
| |
| return !cmpxchg_acquire(&s, 0, 1); |
| |
| which atomically sets s to 1 if it is currently equal to 0 and returns |
| true if it succeeds (the read part of the cmpxchg operation acts as an |
| acquire fence only if the operation is successful). spin_unlock(&s) |
| is treated almost the same as: |
| |
| smp_store_release(&s, 0); |
| |
| The "almost" qualifiers above need some explanation. In the LKMM, the |
| store-release in a spin_unlock() and the load-acquire which forms the |
| first half of the atomic rmw update in a spin_lock() or a successful |
| spin_trylock() -- we can call these things lock-releases and |
| lock-acquires -- have two properties beyond those of ordinary releases |
| and acquires. |
| |
| First, when a lock-acquire reads from or is po-after a lock-release, |
| the LKMM requires that every instruction po-before the lock-release |
| must execute before any instruction po-after the lock-acquire. This |
| would naturally hold if the release and acquire operations were on |
| different CPUs and accessed the same lock variable, but the LKMM says |
| it also holds when they are on the same CPU, even if they access |
| different lock variables. For example: |
| |
| int x, y; |
| spinlock_t s, t; |
| |
| P0() |
| { |
| int r1, r2; |
| |
| spin_lock(&s); |
| r1 = READ_ONCE(x); |
| spin_unlock(&s); |
| spin_lock(&t); |
| r2 = READ_ONCE(y); |
| spin_unlock(&t); |
| } |
| |
| P1() |
| { |
| WRITE_ONCE(y, 1); |
| smp_wmb(); |
| WRITE_ONCE(x, 1); |
| } |
| |
| Here the second spin_lock() is po-after the first spin_unlock(), and |
| therefore the load of x must execute before the load of y, even though |
| the two locking operations use different locks. Thus we cannot have |
| r1 = 1 and r2 = 0 at the end (this is an instance of the MP pattern). |
| |
| This requirement does not apply to ordinary release and acquire |
| fences, only to lock-related operations. For instance, suppose P0() |
| in the example had been written as: |
| |
| P0() |
| { |
| int r1, r2, r3; |
| |
| r1 = READ_ONCE(x); |
| smp_store_release(&s, 1); |
| r3 = smp_load_acquire(&s); |
| r2 = READ_ONCE(y); |
| } |
| |
| Then the CPU would be allowed to forward the s = 1 value from the |
| smp_store_release() to the smp_load_acquire(), executing the |
| instructions in the following order: |
| |
| r3 = smp_load_acquire(&s); // Obtains r3 = 1 |
| r2 = READ_ONCE(y); |
| r1 = READ_ONCE(x); |
| smp_store_release(&s, 1); // Value is forwarded |
| |
| and thus it could load y before x, obtaining r2 = 0 and r1 = 1. |
| |
| Second, when a lock-acquire reads from or is po-after a lock-release, |
| and some other stores W and W' occur po-before the lock-release and |
| po-after the lock-acquire respectively, the LKMM requires that W must |
| propagate to each CPU before W' does. For example, consider: |
| |
| int x, y; |
| spinlock_t s; |
| |
| P0() |
| { |
| spin_lock(&s); |
| WRITE_ONCE(x, 1); |
| spin_unlock(&s); |
| } |
| |
| P1() |
| { |
| int r1; |
| |
| spin_lock(&s); |
| r1 = READ_ONCE(x); |
| WRITE_ONCE(y, 1); |
| spin_unlock(&s); |
| } |
| |
| P2() |
| { |
| int r2, r3; |
| |
| r2 = READ_ONCE(y); |
| smp_rmb(); |
| r3 = READ_ONCE(x); |
| } |
| |
| If r1 = 1 at the end then the spin_lock() in P1 must have read from |
| the spin_unlock() in P0. Hence the store to x must propagate to P2 |
| before the store to y does, so we cannot have r2 = 1 and r3 = 0. But |
| if P1 had used a lock variable different from s, the writes could have |
| propagated in either order. (On the other hand, if the code in P0 and |
| P1 had all executed on a single CPU, as in the example before this |
| one, then the writes would have propagated in order even if the two |
| critical sections used different lock variables.) |
| |
| These two special requirements for lock-release and lock-acquire do |
| not arise from the operational model. Nevertheless, kernel developers |
| have come to expect and rely on them because they do hold on all |
| architectures supported by the Linux kernel, albeit for various |
| differing reasons. |
| |
| |
| PLAIN ACCESSES AND DATA RACES |
| ----------------------------- |
| |
| In the LKMM, memory accesses such as READ_ONCE(x), atomic_inc(&y), |
| smp_load_acquire(&z), and so on are collectively referred to as |
| "marked" accesses, because they are all annotated with special |
| operations of one kind or another. Ordinary C-language memory |
| accesses such as x or y = 0 are simply called "plain" accesses. |
| |
| Early versions of the LKMM had nothing to say about plain accesses. |
| The C standard allows compilers to assume that the variables affected |
| by plain accesses are not concurrently read or written by any other |
| threads or CPUs. This leaves compilers free to implement all manner |
| of transformations or optimizations of code containing plain accesses, |
| making such code very difficult for a memory model to handle. |
| |
| Here is just one example of a possible pitfall: |
| |
| int a = 6; |
| int *x = &a; |
| |
| P0() |
| { |
| int *r1; |
| int r2 = 0; |
| |
| r1 = x; |
| if (r1 != NULL) |
| r2 = READ_ONCE(*r1); |
| } |
| |
| P1() |
| { |
| WRITE_ONCE(x, NULL); |
| } |
| |
| On the face of it, one would expect that when this code runs, the only |
| possible final values for r2 are 6 and 0, depending on whether or not |
| P1's store to x propagates to P0 before P0's load from x executes. |
| But since P0's load from x is a plain access, the compiler may decide |
| to carry out the load twice (for the comparison against NULL, then again |
| for the READ_ONCE()) and eliminate the temporary variable r1. The |
| object code generated for P0 could therefore end up looking rather |
| like this: |
| |
| P0() |
| { |
| int r2 = 0; |
| |
| if (x != NULL) |
| r2 = READ_ONCE(*x); |
| } |
| |
| And now it is obvious that this code runs the risk of dereferencing a |
| NULL pointer, because P1's store to x might propagate to P0 after the |
| test against NULL has been made but before the READ_ONCE() executes. |
| If the original code had said "r1 = READ_ONCE(x)" instead of "r1 = x", |
| the compiler would not have performed this optimization and there |
| would be no possibility of a NULL-pointer dereference. |
| |
| Given the possibility of transformations like this one, the LKMM |
| doesn't try to predict all possible outcomes of code containing plain |
| accesses. It is instead content to determine whether the code |
| violates the compiler's assumptions, which would render the ultimate |
| outcome undefined. |
| |
| In technical terms, the compiler is allowed to assume that when the |
| program executes, there will not be any data races. A "data race" |
| occurs when there are two memory accesses such that: |
| |
| 1. they access the same location, |
| |
| 2. at least one of them is a store, |
| |
| 3. at least one of them is plain, |
| |
| 4. they occur on different CPUs (or in different threads on the |
| same CPU), and |
| |
| 5. they execute concurrently. |
| |
| In the literature, two accesses are said to "conflict" if they satisfy |
| 1 and 2 above. We'll go a little farther and say that two accesses |
| are "race candidates" if they satisfy 1 - 4. Thus, whether or not two |
| race candidates actually do race in a given execution depends on |
| whether they are concurrent. |
| |
| The LKMM tries to determine whether a program contains race candidates |
| which may execute concurrently; if it does then the LKMM says there is |
| a potential data race and makes no predictions about the program's |
| outcome. |
| |
| Determining whether two accesses are race candidates is easy; you can |
| see that all the concepts involved in the definition above are already |
| part of the memory model. The hard part is telling whether they may |
| execute concurrently. The LKMM takes a conservative attitude, |
| assuming that accesses may be concurrent unless it can prove they |
| are not. |
| |
| If two memory accesses aren't concurrent then one must execute before |
| the other. Therefore the LKMM decides two accesses aren't concurrent |
| if they can be connected by a sequence of hb, pb, and rb links |
| (together referred to as xb, for "executes before"). However, there |
| are two complicating factors. |
| |
| If X is a load and X executes before a store Y, then indeed there is |
| no danger of X and Y being concurrent. After all, Y can't have any |
| effect on the value obtained by X until the memory subsystem has |
| propagated Y from its own CPU to X's CPU, which won't happen until |
| some time after Y executes and thus after X executes. But if X is a |
| store, then even if X executes before Y it is still possible that X |
| will propagate to Y's CPU just as Y is executing. In such a case X |
| could very well interfere somehow with Y, and we would have to |
| consider X and Y to be concurrent. |
| |
| Therefore when X is a store, for X and Y to be non-concurrent the LKMM |
| requires not only that X must execute before Y but also that X must |
| propagate to Y's CPU before Y executes. (Or vice versa, of course, if |
| Y executes before X -- then Y must propagate to X's CPU before X |
| executes if Y is a store.) This is expressed by the visibility |
| relation (vis), where X ->vis Y is defined to hold if there is an |
| intermediate event Z such that: |
| |
| X is connected to Z by a possibly empty sequence of |
| cumul-fence links followed by an optional rfe link (if none of |
| these links are present, X and Z are the same event), |
| |
| and either: |
| |
| Z is connected to Y by a strong-fence link followed by a |
| possibly empty sequence of xb links, |
| |
| or: |
| |
| Z is on the same CPU as Y and is connected to Y by a possibly |
| empty sequence of xb links (again, if the sequence is empty it |
| means Z and Y are the same event). |
| |
| The motivations behind this definition are straightforward: |
| |
| cumul-fence memory barriers force stores that are po-before |
| the barrier to propagate to other CPUs before stores that are |
| po-after the barrier. |
| |
| An rfe link from an event W to an event R says that R reads |
| from W, which certainly means that W must have propagated to |
| R's CPU before R executed. |
| |
| strong-fence memory barriers force stores that are po-before |
| the barrier, or that propagate to the barrier's CPU before the |
| barrier executes, to propagate to all CPUs before any events |
| po-after the barrier can execute. |
| |
| To see how this works out in practice, consider our old friend, the MP |
| pattern (with fences and statement labels, but without the conditional |
| test): |
| |
| int buf = 0, flag = 0; |
| |
| P0() |
| { |
| X: WRITE_ONCE(buf, 1); |
| smp_wmb(); |
| W: WRITE_ONCE(flag, 1); |
| } |
| |
| P1() |
| { |
| int r1; |
| int r2 = 0; |
| |
| Z: r1 = READ_ONCE(flag); |
| smp_rmb(); |
| Y: r2 = READ_ONCE(buf); |
| } |
| |
| The smp_wmb() memory barrier gives a cumul-fence link from X to W, and |
| assuming r1 = 1 at the end, there is an rfe link from W to Z. This |
| means that the store to buf must propagate from P0 to P1 before Z |
| executes. Next, Z and Y are on the same CPU and the smp_rmb() fence |
| provides an xb link from Z to Y (i.e., it forces Z to execute before |
| Y). Therefore we have X ->vis Y: X must propagate to Y's CPU before Y |
| executes. |
| |
| The second complicating factor mentioned above arises from the fact |
| that when we are considering data races, some of the memory accesses |
| are plain. Now, although we have not said so explicitly, up to this |
| point most of the relations defined by the LKMM (ppo, hb, prop, |
| cumul-fence, pb, and so on -- including vis) apply only to marked |
| accesses. |
| |
| There are good reasons for this restriction. The compiler is not |
| allowed to apply fancy transformations to marked accesses, and |
| consequently each such access in the source code corresponds more or |
| less directly to a single machine instruction in the object code. But |
| plain accesses are a different story; the compiler may combine them, |
| split them up, duplicate them, eliminate them, invent new ones, and |
| who knows what else. Seeing a plain access in the source code tells |
| you almost nothing about what machine instructions will end up in the |
| object code. |
| |
| Fortunately, the compiler isn't completely free; it is subject to some |
| limitations. For one, it is not allowed to introduce a data race into |
| the object code if the source code does not already contain a data |
| race (if it could, memory models would be useless and no multithreaded |
| code would be safe!). For another, it cannot move a plain access past |
| a compiler barrier. |
| |
| A compiler barrier is a kind of fence, but as the name implies, it |
| only affects the compiler; it does not necessarily have any effect on |
| how instructions are executed by the CPU. In Linux kernel source |
| code, the barrier() function is a compiler barrier. It doesn't give |
| rise directly to any machine instructions in the object code; rather, |
| it affects how the compiler generates the rest of the object code. |
| Given source code like this: |
| |
| ... some memory accesses ... |
| barrier(); |
| ... some other memory accesses ... |
| |
| the barrier() function ensures that the machine instructions |
| corresponding to the first group of accesses will all end po-before |
| any machine instructions corresponding to the second group of accesses |
| -- even if some of the accesses are plain. (Of course, the CPU may |
| then execute some of those accesses out of program order, but we |
| already know how to deal with such issues.) Without the barrier() |
| there would be no such guarantee; the two groups of accesses could be |
| intermingled or even reversed in the object code. |
| |
| The LKMM doesn't say much about the barrier() function, but it does |
| require that all fences are also compiler barriers. In addition, it |
| requires that the ordering properties of memory barriers such as |
| smp_rmb() or smp_store_release() apply to plain accesses as well as to |
| marked accesses. |
| |
| This is the key to analyzing data races. Consider the MP pattern |
| again, now using plain accesses for buf: |
| |
| int buf = 0, flag = 0; |
| |
| P0() |
| { |
| U: buf = 1; |
| smp_wmb(); |
| X: WRITE_ONCE(flag, 1); |
| } |
| |
| P1() |
| { |
| int r1; |
| int r2 = 0; |
| |
| Y: r1 = READ_ONCE(flag); |
| if (r1) { |
| smp_rmb(); |
| V: r2 = buf; |
| } |
| } |
| |
| This program does not contain a data race. Although the U and V |
| accesses are race candidates, the LKMM can prove they are not |
| concurrent as follows: |
| |
| The smp_wmb() fence in P0 is both a compiler barrier and a |
| cumul-fence. It guarantees that no matter what hash of |
| machine instructions the compiler generates for the plain |
| access U, all those instructions will be po-before the fence. |
| Consequently U's store to buf, no matter how it is carried out |
| at the machine level, must propagate to P1 before X's store to |
| flag does. |
| |
| X and Y are both marked accesses. Hence an rfe link from X to |
| Y is a valid indicator that X propagated to P1 before Y |
| executed, i.e., X ->vis Y. (And if there is no rfe link then |
| r1 will be 0, so V will not be executed and ipso facto won't |
| race with U.) |
| |
| The smp_rmb() fence in P1 is a compiler barrier as well as a |
| fence. It guarantees that all the machine-level instructions |
| corresponding to the access V will be po-after the fence, and |
| therefore any loads among those instructions will execute |
| after the fence does and hence after Y does. |
| |
| Thus U's store to buf is forced to propagate to P1 before V's load |
| executes (assuming V does execute), ruling out the possibility of a |
| data race between them. |
| |
| This analysis illustrates how the LKMM deals with plain accesses in |
| general. Suppose R is a plain load and we want to show that R |
| executes before some marked access E. We can do this by finding a |
| marked access X such that R and X are ordered by a suitable fence and |
| X ->xb* E. If E was also a plain access, we would also look for a |
| marked access Y such that X ->xb* Y, and Y and E are ordered by a |
| fence. We describe this arrangement by saying that R is |
| "post-bounded" by X and E is "pre-bounded" by Y. |
| |
| In fact, we go one step further: Since R is a read, we say that R is |
| "r-post-bounded" by X. Similarly, E would be "r-pre-bounded" or |
| "w-pre-bounded" by Y, depending on whether E was a store or a load. |
| This distinction is needed because some fences affect only loads |
| (i.e., smp_rmb()) and some affect only stores (smp_wmb()); otherwise |
| the two types of bounds are the same. And as a degenerate case, we |
| say that a marked access pre-bounds and post-bounds itself (e.g., if R |
| above were a marked load then X could simply be taken to be R itself.) |
| |
| The need to distinguish between r- and w-bounding raises yet another |
| issue. When the source code contains a plain store, the compiler is |
| allowed to put plain loads of the same location into the object code. |
| For example, given the source code: |
| |
| x = 1; |
| |
| the compiler is theoretically allowed to generate object code that |
| looks like: |
| |
| if (x != 1) |
| x = 1; |
| |
| thereby adding a load (and possibly replacing the store entirely). |
| For this reason, whenever the LKMM requires a plain store to be |
| w-pre-bounded or w-post-bounded by a marked access, it also requires |
| the store to be r-pre-bounded or r-post-bounded, so as to handle cases |
| where the compiler adds a load. |
| |
| (This may be overly cautious. We don't know of any examples where a |
| compiler has augmented a store with a load in this fashion, and the |
| Linux kernel developers would probably fight pretty hard to change a |
| compiler if it ever did this. Still, better safe than sorry.) |
| |
| Incidentally, the other tranformation -- augmenting a plain load by |
| adding in a store to the same location -- is not allowed. This is |
| because the compiler cannot know whether any other CPUs might perform |
| a concurrent load from that location. Two concurrent loads don't |
| constitute a race (they can't interfere with each other), but a store |
| does race with a concurrent load. Thus adding a store might create a |
| data race where one was not already present in the source code, |
| something the compiler is forbidden to do. Augmenting a store with a |
| load, on the other hand, is acceptable because doing so won't create a |
| data race unless one already existed. |
| |
| The LKMM includes a second way to pre-bound plain accesses, in |
| addition to fences: an address dependency from a marked load. That |
| is, in the sequence: |
| |
| p = READ_ONCE(ptr); |
| r = *p; |
| |
| the LKMM says that the marked load of ptr pre-bounds the plain load of |
| *p; the marked load must execute before any of the machine |
| instructions corresponding to the plain load. This is a reasonable |
| stipulation, since after all, the CPU can't perform the load of *p |
| until it knows what value p will hold. Furthermore, without some |
| assumption like this one, some usages typical of RCU would count as |
| data races. For example: |
| |
| int a = 1, b; |
| int *ptr = &a; |
| |
| P0() |
| { |
| b = 2; |
| rcu_assign_pointer(ptr, &b); |
| } |
| |
| P1() |
| { |
| int *p; |
| int r; |
| |
| rcu_read_lock(); |
| p = rcu_dereference(ptr); |
| r = *p; |
| rcu_read_unlock(); |
| } |
| |
| (In this example the rcu_read_lock() and rcu_read_unlock() calls don't |
| really do anything, because there aren't any grace periods. They are |
| included merely for the sake of good form; typically P0 would call |
| synchronize_rcu() somewhere after the rcu_assign_pointer().) |
| |
| rcu_assign_pointer() performs a store-release, so the plain store to b |
| is definitely w-post-bounded before the store to ptr, and the two |
| stores will propagate to P1 in that order. However, rcu_dereference() |
| is only equivalent to READ_ONCE(). While it is a marked access, it is |
| not a fence or compiler barrier. Hence the only guarantee we have |
| that the load of ptr in P1 is r-pre-bounded before the load of *p |
| (thus avoiding a race) is the assumption about address dependencies. |
| |
| This is a situation where the compiler can undermine the memory model, |
| and a certain amount of care is required when programming constructs |
| like this one. In particular, comparisons between the pointer and |
| other known addresses can cause trouble. If you have something like: |
| |
| p = rcu_dereference(ptr); |
| if (p == &x) |
| r = *p; |
| |
| then the compiler just might generate object code resembling: |
| |
| p = rcu_dereference(ptr); |
| if (p == &x) |
| r = x; |
| |
| or even: |
| |
| rtemp = x; |
| p = rcu_dereference(ptr); |
| if (p == &x) |
| r = rtemp; |
| |
| which would invalidate the memory model's assumption, since the CPU |
| could now perform the load of x before the load of ptr (there might be |
| a control dependency but no address dependency at the machine level). |
| |
| Finally, it turns out there is a situation in which a plain write does |
| not need to be w-post-bounded: when it is separated from the other |
| race-candidate access by a fence. At first glance this may seem |
| impossible. After all, to be race candidates the two accesses must |
| be on different CPUs, and fences don't link events on different CPUs. |
| Well, normal fences don't -- but rcu-fence can! Here's an example: |
| |
| int x, y; |
| |
| P0() |
| { |
| WRITE_ONCE(x, 1); |
| synchronize_rcu(); |
| y = 3; |
| } |
| |
| P1() |
| { |
| rcu_read_lock(); |
| if (READ_ONCE(x) == 0) |
| y = 2; |
| rcu_read_unlock(); |
| } |
| |
| Do the plain stores to y race? Clearly not if P1 reads a non-zero |
| value for x, so let's assume the READ_ONCE(x) does obtain 0. This |
| means that the read-side critical section in P1 must finish executing |
| before the grace period in P0 does, because RCU's Grace-Period |
| Guarantee says that otherwise P0's store to x would have propagated to |
| P1 before the critical section started and so would have been visible |
| to the READ_ONCE(). (Another way of putting it is that the fre link |
| from the READ_ONCE() to the WRITE_ONCE() gives rise to an rcu-link |
| between those two events.) |
| |
| This means there is an rcu-fence link from P1's "y = 2" store to P0's |
| "y = 3" store, and consequently the first must propagate from P1 to P0 |
| before the second can execute. Therefore the two stores cannot be |
| concurrent and there is no race, even though P1's plain store to y |
| isn't w-post-bounded by any marked accesses. |
| |
| Putting all this material together yields the following picture. For |
| race-candidate stores W and W', where W ->co W', the LKMM says the |
| stores don't race if W can be linked to W' by a |
| |
| w-post-bounded ; vis ; w-pre-bounded |
| |
| sequence. If W is plain then they also have to be linked by an |
| |
| r-post-bounded ; xb* ; w-pre-bounded |
| |
| sequence, and if W' is plain then they also have to be linked by a |
| |
| w-post-bounded ; vis ; r-pre-bounded |
| |
| sequence. For race-candidate load R and store W, the LKMM says the |
| two accesses don't race if R can be linked to W by an |
| |
| r-post-bounded ; xb* ; w-pre-bounded |
| |
| sequence or if W can be linked to R by a |
| |
| w-post-bounded ; vis ; r-pre-bounded |
| |
| sequence. For the cases involving a vis link, the LKMM also accepts |
| sequences in which W is linked to W' or R by a |
| |
| strong-fence ; xb* ; {w and/or r}-pre-bounded |
| |
| sequence with no post-bounding, and in every case the LKMM also allows |
| the link simply to be a fence with no bounding at all. If no sequence |
| of the appropriate sort exists, the LKMM says that the accesses race. |
| |
| There is one more part of the LKMM related to plain accesses (although |
| not to data races) we should discuss. Recall that many relations such |
| as hb are limited to marked accesses only. As a result, the |
| happens-before, propagates-before, and rcu axioms (which state that |
| various relation must not contain a cycle) doesn't apply to plain |
| accesses. Nevertheless, we do want to rule out such cycles, because |
| they don't make sense even for plain accesses. |
| |
| To this end, the LKMM imposes three extra restrictions, together |
| called the "plain-coherence" axiom because of their resemblance to the |
| rules used by the operational model to ensure cache coherence (that |
| is, the rules governing the memory subsystem's choice of a store to |
| satisfy a load request and its determination of where a store will |
| fall in the coherence order): |
| |
| If R and W are race candidates and it is possible to link R to |
| W by one of the xb* sequences listed above, then W ->rfe R is |
| not allowed (i.e., a load cannot read from a store that it |
| executes before, even if one or both is plain). |
| |
| If W and R are race candidates and it is possible to link W to |
| R by one of the vis sequences listed above, then R ->fre W is |
| not allowed (i.e., if a store is visible to a load then the |
| load must read from that store or one coherence-after it). |
| |
| If W and W' are race candidates and it is possible to link W |
| to W' by one of the vis sequences listed above, then W' ->co W |
| is not allowed (i.e., if one store is visible to a second then |
| the second must come after the first in the coherence order). |
| |
| This is the extent to which the LKMM deals with plain accesses. |
| Perhaps it could say more (for example, plain accesses might |
| contribute to the ppo relation), but at the moment it seems that this |
| minimal, conservative approach is good enough. |
| |
| |
| ODDS AND ENDS |
| ------------- |
| |
| This section covers material that didn't quite fit anywhere in the |
| earlier sections. |
| |
| The descriptions in this document don't always match the formal |
| version of the LKMM exactly. For example, the actual formal |
| definition of the prop relation makes the initial coe or fre part |
| optional, and it doesn't require the events linked by the relation to |
| be on the same CPU. These differences are very unimportant; indeed, |
| instances where the coe/fre part of prop is missing are of no interest |
| because all the other parts (fences and rfe) are already included in |
| hb anyway, and where the formal model adds prop into hb, it includes |
| an explicit requirement that the events being linked are on the same |
| CPU. |
| |
| Another minor difference has to do with events that are both memory |
| accesses and fences, such as those corresponding to smp_load_acquire() |
| calls. In the formal model, these events aren't actually both reads |
| and fences; rather, they are read events with an annotation marking |
| them as acquires. (Or write events annotated as releases, in the case |
| smp_store_release().) The final effect is the same. |
| |
| Although we didn't mention it above, the instruction execution |
| ordering provided by the smp_rmb() fence doesn't apply to read events |
| that are part of a non-value-returning atomic update. For instance, |
| given: |
| |
| atomic_inc(&x); |
| smp_rmb(); |
| r1 = READ_ONCE(y); |
| |
| it is not guaranteed that the load from y will execute after the |
| update to x. This is because the ARMv8 architecture allows |
| non-value-returning atomic operations effectively to be executed off |
| the CPU. Basically, the CPU tells the memory subsystem to increment |
| x, and then the increment is carried out by the memory hardware with |
| no further involvement from the CPU. Since the CPU doesn't ever read |
| the value of x, there is nothing for the smp_rmb() fence to act on. |
| |
| The LKMM defines a few extra synchronization operations in terms of |
| things we have already covered. In particular, rcu_dereference() is |
| treated as READ_ONCE() and rcu_assign_pointer() is treated as |
| smp_store_release() -- which is basically how the Linux kernel treats |
| them. |
| |
| Although we said that plain accesses are not linked by the ppo |
| relation, they do contribute to it indirectly. Firstly, when there is |
| an address dependency from a marked load R to a plain store W, |
| followed by smp_wmb() and then a marked store W', the LKMM creates a |
| ppo link from R to W'. The reasoning behind this is perhaps a little |
| shaky, but essentially it says there is no way to generate object code |
| for this source code in which W' could execute before R. Just as with |
| pre-bounding by address dependencies, it is possible for the compiler |
| to undermine this relation if sufficient care is not taken. |
| |
| Secondly, plain accesses can carry dependencies: If a data dependency |
| links a marked load R to a store W, and the store is read by a load R' |
| from the same thread, then the data loaded by R' depends on the data |
| loaded originally by R. Thus, if R' is linked to any access X by a |
| dependency, R is also linked to access X by the same dependency, even |
| if W' or R' (or both!) are plain. |
| |
| There are a few oddball fences which need special treatment: |
| smp_mb__before_atomic(), smp_mb__after_atomic(), and |
| smp_mb__after_spinlock(). The LKMM uses fence events with special |
| annotations for them; they act as strong fences just like smp_mb() |
| except for the sets of events that they order. Instead of ordering |
| all po-earlier events against all po-later events, as smp_mb() does, |
| they behave as follows: |
| |
| smp_mb__before_atomic() orders all po-earlier events against |
| po-later atomic updates and the events following them; |
| |
| smp_mb__after_atomic() orders po-earlier atomic updates and |
| the events preceding them against all po-later events; |
| |
| smp_mb__after_spinlock() orders po-earlier lock acquisition |
| events and the events preceding them against all po-later |
| events. |
| |
| Interestingly, RCU and locking each introduce the possibility of |
| deadlock. When faced with code sequences such as: |
| |
| spin_lock(&s); |
| spin_lock(&s); |
| spin_unlock(&s); |
| spin_unlock(&s); |
| |
| or: |
| |
| rcu_read_lock(); |
| synchronize_rcu(); |
| rcu_read_unlock(); |
| |
| what does the LKMM have to say? Answer: It says there are no allowed |
| executions at all, which makes sense. But this can also lead to |
| misleading results, because if a piece of code has multiple possible |
| executions, some of which deadlock, the model will report only on the |
| non-deadlocking executions. For example: |
| |
| int x, y; |
| |
| P0() |
| { |
| int r0; |
| |
| WRITE_ONCE(x, 1); |
| r0 = READ_ONCE(y); |
| } |
| |
| P1() |
| { |
| rcu_read_lock(); |
| if (READ_ONCE(x) > 0) { |
| WRITE_ONCE(y, 36); |
| synchronize_rcu(); |
| } |
| rcu_read_unlock(); |
| } |
| |
| Is it possible to end up with r0 = 36 at the end? The LKMM will tell |
| you it is not, but the model won't mention that this is because P1 |
| will self-deadlock in the executions where it stores 36 in y. |