Is it possible to vectorize myNum += a[b[i]] * c[i]; on x86_64?

What intrinsics would I use to vectorize the following(if it's even possible to vectorize) on the x86_64?

``````double myNum = 0;
for(int i=0;i<n;i++){
myNum += a[b[i]] * c[i]; //b[i] = int, a[b[i]] = double, c[i] = double
}
``````
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What is the distribution of indices in b? –  MSN Feb 28 '10 at 5:21
Unknown, until runtime. –  Mike Feb 28 '10 at 5:31
Just curious, did the suggestions below help speed up your code? –  celion Mar 1 '10 at 23:45

Here's my go at it, fully optimized and tested:

``````#include <emmintrin.h>

__m128d sum = _mm_setzero_pd();
for(int i=0; i<n; i+=2) {
_mm_setr_pd(a[b[i]], a[b[i+1]])
));
}

if(n & 1) {
sum = _mm_add_pd(sum, _mm_set_sd(a[b[n-1]] * c[n-1]));
}

sum, _mm_shuffle_pd(sum, sum, _MM_SHUFFLE2(0, 1))
));
``````

This produces very beautiful assembly code using `gcc -O2 -msse2` (4.4.1).

As you can tell, having an even `n` will make this loop go faster as well as an aligned `c`. If you can align `c`, change `_mm_loadu_pd` to `_mm_load_pd` for an even faster execution times.

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Oh, hey, wow - I didn't mean to snatch the selected answer off @celion... It was my personal fun... –  LiraNuna Mar 3 '10 at 5:11
I'm sure I'll get over it eventually :) I think a combination of both of our answers would be optimal - my unrolling the loop again, and your loading 'c' via intrinsic. –  celion Mar 3 '10 at 21:19

I would start by unrolling the loop. Something like

``````double myNum1 = 0, myNum2=0;
for(int i=0;i<n;i+=2)
{
myNum1 += a[b[ i ]] * c[ i ];
myNum2 += a[b[i+1]] * c[i+1];
}
// ...extra code to handle the remainder when n isn't a multiple of 2...
double myNum = myNum1 + myNum2;
``````

Hopefully that allows the compiler to interleave the loads with the arithmetic; profile and look at the assembly to see if there's an improvement. Ideally the compiler will generate SSE instructions, but I'm not if that happens in practice.

Unrolling further might let you do this:

``````__m128d sum0, sum1;
// ...initialize to zero...
for(int i=0;i<n;i+=4)
{
double temp0 = a[b[ i ]] * c[ i ];
double temp1 = a[b[i+1]] * c[i+1];
double temp2 = a[b[i+2]] * c[i+2];
double temp3 = a[b[i+3]] * c[i+3];
__m128d pair0 = _mm_set_pd(temp0, temp1);
__m128d pair1 = _mm_set_pd(temp2, temp3);
}
// ...extra code to handle the remainder when n isn't a multiple of 4...
``````

(apologies for the pseudocode at the start and end, I figure the important part was the loop). I don't know for sure whether that will be faster; it depends on the various latencies and how well the compiler can rearrange everything. Make sure you profile before and after to see whether there was an actual improvement.

Hope that helps.

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Also, it might not be useful at the moment, but I believe Intel's upcoming architecture, Larrabee, will have gather/scatter instructions to deal with this sort of case. See drdobbs.com/architect/216402188?pgno=4 for some information on it. –  celion Feb 28 '10 at 11:39

Intel processors can issue two floating point operations but one load per cycle, so memory accesses are the tightest constraint. With that in mind, I aimed first to use packed loads to reduce the number of load instructions, and used packed arithmetic just because it was convenient. I've since realized that saturating memory bandwidth may be the biggest issue, and all the messing around with SSE instructions might have been premature optimization if the point was to make the code go fast rather than learn to vectorize.

SSE

The fewest possible loads with no assumption on the indices in `b` requires unrolling the loop four times. One 128 bit load gets four indices from `b`, two 128 bit loads each get a pair of adjacent doubles from `c`, and gathering `a` required independent 64-bit loads. That's a floor of 7 cycles per four iterations for serial code. (enough to saturate my memory bandwidth if access to `a` doesn't cache nicely). I've left out some annoying things like handling a number of iterations which is not a multiple of 4.

``````entry: ; (rdi,rsi,rdx,rcx) are (n,a,b,c)
xorpd xmm0, xmm0
xor r8, r8
loop:
movdqa xmm1, [rdx+4*r8]
movapd xmm2, [rcx+8*r8]
movapd xmm3, [rcx+8*r8+8]
movd   r9,   xmm1
movq   r10,  xmm1
movsd  xmm4, [rsi+8*r9]
shr    r10,  32
movhpd xmm4, [rsi+8*r10]
punpckhqdq xmm1, xmm1
movd   r9,   xmm1
movq   r10,  xmm1
movsd  xmm5, [rsi+8*r9]
shr    r10,  32
movhpd xmm5, [rsi+8*r10]
cmp    r8,   rdi
mulpd  xmm2, xmm4
mulpd  xmm3, xmm5
jl loop
``````

Getting the indices out is the most complicated part. `movdqa` loads 128 bits of integer data from a 16 byte aligned address (Nehalem has latency penalties for mixing the "integer" and "float" SSE instructions). `punpckhqdq` moves high 64 bits to low 64 bits, but in integer mode unlike the more simply named `movhlpd`. 32 bit shifts are done in the general purpose registers. `movhpd` loads one double into the upper part of an xmm register without disturbing the lower part - this is used to load the elements of `a` directly into packed registers.

This code distinctly faster than the code above, which is in turn faster than the simple code, and on every access pattern but the simple case `B[i] = i` where the naive loop is actually fastest. I also tried a few thing like a function around `SUM(A(B(:)),C(:))` in Fortran which ended up basically equivalent to the simple loop.

I tested on a Q6600 (65 nm Core 2 at 2.4Ghz) with 4GB of DDR2-667 memory, in 4 modules. Testing memory bandwidth gives about 5333 MB/s, so it seems like I'm only seeing a single channel. I'm compiling with Debian's gcc 4.3.2-1.1, -O3 -Ffast-math -msse2 -Ftree-vectorize -std=gnu99.

For testing I'm letting `n` be one million, initializing the arrays so `a[b[i]]` and `c[i]` both equal `1.0/(i+1)`, with a few different patterns of indices. One allocates `a` with a million elements and sets `b` to a random permutation, another allocates `a` with 10M elements and uses every 10th, and the last allocates `a` with 10M elements and sets up `b[i+1]` by adding a random number from 1 to 9 to `b[i]`. I'm timing how long one call takes with `gettimeofday`, clearing the caches by calling `clflush` over the arrays, and measuring 1000 trials of each function. I plotted smoothed runtime distributions using some code from the guts of criterion (in particular, the kernel density estimator in the `statistics` package).

Bandwidth

Now, for the actual important note about bandwidth. 5333MB/s with 2.4Ghz clock is just over two bytes per cycle. My data is long enough that nothing should be cacheable, and multiplying the runtime of my loop by (16+2*16+4*64) bytes loaded per iteration if everything misses gives me almost exactly the ~5333MB/s bandwidth my system has. It should be pretty easy to saturate that bandwidth without SSE. Even assuming `a` were completely cached, just reading `b` and `c` for one iteration moves 12 bytes of data, and the naive can start a new iteration ever third cycle with pipelining.

Assuming anything less than complete caching on `a` makes arithmetic and instruction count even less of a bottleneck. I wouldn't be surprised if most of the speedup in my code comes from issuing fewer loads to `b` and `c` so more space is free to track and speculate past cache misses on `a`.

Wider hardware might make more difference. A Nehalem system running three channels of DDR3-1333 would need to move 3*10667/2.66 = 12.6 bytes per cycle to saturate memory bandwidth. That would be impossible for a single thread if `a` fits in cache - but at 64 bytes a line cache misses on the vector add up quickly - just one of the four loads in my loop missing in caches brings up the average required bandwidth to 16 bytes/cycle.

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short answer no. Long answer yes, but not efficiently. You will incur the penalty for doing nonaligned loads which will negate any kind of benefit. Unless you can guarantee that b[i] successive indices are aligned, you will most likely have worse performance after the vectorization

if you know beforehand what indices are, your best that is to unroll and specify explicit indices. I did something similar using template specialization and code generation. if your interested, I can share

to answer your comment, you basically have to concentrate on a array. Easiest thing to try right away is to block you loop by a factor of two, load low and high a separately, and then use mm*_pd like usually. Pseudocode:

``````__m128d a, result;
for(i = 0; i < n; i +=2) {
((double*)(&a))[0] = A[B[i]];
((double*)(&a))[1] = A[B[i+1]];
// you may also load B using packed integer instruction
}
``````

I do not remember function names exactly, may want to double check. Also, use restrict keyword with the pointers if you know there can be no aliasing issues. This will allow compiler to be much more aggressive.

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Can you explain how I'd go about vectorizing this(even with the non-aligned penalty)? I'd be curious to benchmark the performance myself. –  Mike Feb 28 '10 at 5:02
This is not going to work, because of the double indirection of the indices. –  Paul R Feb 28 '10 at 9:11
I don't think restrict will have any benefit here, since all the writes are to a local variable. If they were computing d[i] = a[b[i]] * c[i], then restrict on d would help. –  celion Feb 28 '10 at 11:09
@Paul, Why not further utilize features that are already in use? x86_64's fpu is already consistent of `mulsd` and `addsd`, why not use the same instruction (that costs the same amount of cycles) into doing DOUBLE the work? See my answer to how to make the best use of SSE(2) for this case. –  LiraNuna Mar 2 '10 at 2:48