I don't know Haskell concurrency, but I know something about memory models.
Processors can reorder instructions the way they like: loads may go ahead of loads, loads may go ahead of stores, loads of dependent stuff may go ahead of loads of stuff they depend on (a[i] may load the value from array first, then the reference to array a!), stores may be reordered with each other. You simply cannot put a finger on it and say "these two things definitely appear in a particular order, because there is no way they can be reordered". But in order for concurrent algorithms to operate, they need to observe the state of other threads. This is where it is important for thread state to proceed in a particular order. This is achieved by placing barriers between instructions, which guarantee the order of instructions to appear the same to all processors.
Typically (one of the simplest models), you want two types of ordered instructions: ordered load that does not go ahead of any other ordered loads or stores, and ordered store that does not go ahead of any instructions at all, and a guarantee that all ordered instructions appear in the same order to all processors. This way you can reason about IRIW kind of problem:
Thread 1: x=1
Thread 2: y=1
Thread 3: r1=x;
Thread 4: r4=y;
If all of these operations are ordered loads and ordered stores, then you can conclude the outcome
(1,0,0,1)=(r1,r2,r3,r4) is not possible. Indeed, ordered stores in Threads 1 and 2 should appear in some order to all threads, and r1=1,r2=0 is witness that y=1 is executed after x=1. In its turn, this means that Thread 4 can never observe r4=1 without observing r3=1 (which is executed after r4=1) (if the ordered stores happen to be executed that way, observing y==1 implies x==1).
Also, if the loads and stores were not ordered, the processors would usually be allowed to observe the assignments to appear even in different orders: one might see x=1 appear before y=1, the other might see y=1 appear before x=1, so any combination of values r1,r2,r3,r4 is permitted.
This is sufficiently implemented like so:
load-load -- barriers stopping other loads to go ahead of preceding loads
load-store -- no one is allowed to go ahead of ordered load
store-store -- ordered store must appear after all stores
-- preceding it in program order - serialize all stores
-- (flush write buffers)
store-load -- ordered loads must not go ahead of ordered store
-- preceding them in program order
Of these two, I can see IORef implements a ordered store (
atomicWriteIORef), but I don't see a ordered load (
atomicReadIORef), without which you cannot reason about IRIW problem above. This is not a problem, if your target platform is x86, because all loads will be executed in program order on that platform, and stores never go ahead of loads (in effect, all loads are ordered loads).
A atomic update (
atomicModifyIORef) seems to me a implementation of a so-called CAS loop (compare-and-set loop, which does not stop until a value is atomically set to b, if its value is a). You can see the atomic modify operation as a fusion of a ordered load and ordered store, with all those barriers there, and executed atomically - no processor is allowed to insert a modification instruction between load and store of a CAS.
Furthermore, writeIORef is cheaper than atomicWriteIORef, so you want to use writeIORef as much as your inter-thread communication protocol permits. Whereas
writeIORef x vx >> writeIORef y vy >> atomicWriteIORef z vz >> readIORef t does not guarantee the order in which writeIORefs appear to other threads with respect to each other, there is a guarantee that they both will appear before
atomicWriteIORef - so, seeing z==vz, you can conclude at this moment x==vx and y==vy, and you can conclude IORef t was loaded after stores to x, y, z can be observed by other threads. This latter point requires readIORef to be a ordered load, which is not provided as far as I can tell, but it will work like a ordered load on x86.
Typically you don't use concrete values of x, y, z, when reasoning about the algorithm. Instead, some algorithm-dependent invariants about the assigned values must hold, and can be proven - for example, like in IRIW case you can guarantee that Thread 4 will never see
(0,1)=(r3,r4), if Thread 3 sees
(1,0)=(r1,r2), and Thread 3 can take advantage of this: this means something is mutually excluded without acquiring any mutex or lock.
An example (not in Haskell) that will not work if loads are not ordered, or ordered stores do not flush write buffers (the requirement to make written values visible before the ordered load executes).
Suppose, z will show either x until y is computed, or y, if x has been computed, too. Don't ask why, it is not very easy to see outside the context - it is a kind of a queue - just enjoy what sort of reasoning is possible.
Thread 1: x=1;
if (z==0) compareAndSet(z, 0, y == 0? x: y);
Thread 2: y=2;
if (x != 0) while ((tmp=z) != y && !compareAndSet(z, tmp, y));
So, two threads set x and y, then set z to x or y, depending on whether y or x were computed, too. Assuming initially all are 0. Translating into loads and stores:
Thread 1: store x,1
if ==0 then
if == 0 then load x -- if loaded y is still 0, load x into tmp
else load y -- otherwise, load y into tmp
CAS z, 0, tmp -- CAS whatever was loaded in the previous if-statement
-- the CAS may fail, but see explanation
Thread 2: store y,2
if !=0 then
loop: load z -- into tmp
if !=tmp then -- compare loaded y to tmp
CAS z, tmp, y -- attempt to CAS z: if it is still tmp, set to y
if ! then goto loop -- if CAS did not succeed, go to loop
If Thread 1
load z is not a ordered load, then it will be allowed to go ahead of a ordered store (
store x). It means wherever z is loaded to (a register, cache line, stack,...), the value is such that existed before the value of x can be visible. Looking at that value is useless - you cannot then judge where Thread 2 is up to. For the same reason you've got to have a guarantee that the write buffers were flushed before
load z executed - otherwise it will still appear as a load of a value that existed before Thread 2 could see the value of x. This is important as will become clear below.
If Thread 2
load x or
load z are not ordered loads, they may go ahead of
store y, and will observe the values that were written before y is visible to other threads.
However, see that if the loads and stores are ordered, then the threads can negotiate who is to set the value of z without contending z. For example, if Thread 2 observes x==0, there is guarantee that Thread 1 will definitely execute x=1 later, and will see z==0 after that - so Thread 2 can leave without attempting to set z.
If Thread 1 observes z==0, then it should try to set z to x or y. So, first it will check if y has been set already. If it wasn't set, it will be set in the future, so try to set to x - CAS may fail, but only if Thread 2 concurrently set z to y, so no need to retry. Similarly there is no need to retry if Thread 1 observed y has been set: if CAS fails, then it has been set by Thread 2 to y. Thus we can see Thread 1 sets z to x or y in accordance with the requirement, and does not contend z too much.
On the other hand, Thread 2 can check if x has been computed already. If not, then it will be Thread 1's job to set z. If Thread 1 has computed x, then need to set z to y. Here we do need a CAS loop, because a single CAS may fail, if Thread 1 is attempting to set z to x or y concurrently.
The important takeaway here is that if "unrelated" loads and stores are not serialized (including flushing write buffers), no such reasoning is possible. However, once loads and stores are ordered, both threads can figure out the path each of them _will_take_in_the_future, and that way eliminate contention in half the cases. Most of the time x and y will be computed at significantly different times, so if y is computed before x, it is likely Thread 2 will not touch z at all. (Typically, "touching z" also possibly means "wake up a thread waiting on a cond_var z", so it is not only a matter of loading something from memory)