# Why is my program slow when looping over exactly 8192 elements?

Here is the extract from the program in question. The matrix `img[][]` has the size SIZE×SIZE, and is initialized at:

`img[j][i] = 2 * j + i`

Then, you make a matrix `res[][]`, and each field in here is made to be the average of the 9 fields around it in the img matrix. The border is left at 0 for simplicity.

``````for(i=1;i<SIZE-1;i++)
for(j=1;j<SIZE-1;j++) {
res[j][i]=0;
for(k=-1;k<2;k++)
for(l=-1;l<2;l++)
res[j][i] += img[j+l][i+k];
res[j][i] /= 9;
}
``````

That's all there's to the program. For completeness' sake, here is what comes before. No code comes after. As you can see, it's just initialization.

``````#define SIZE 8192
float img[SIZE][SIZE]; // input image
float res[SIZE][SIZE]; //result of mean filter
int i,j,k,l;
for(i=0;i<SIZE;i++)
for(j=0;j<SIZE;j++)
img[j][i] = (2*j+i)%8196;
``````

Basically, this program is slow when SIZE is a multiple of 2048, e.g. the execution times:

``````SIZE = 8191: 3.44 secs
SIZE = 8192: 7.20 secs
SIZE = 8193: 3.18 secs
``````

The compiler is GCC. From what I know, this is because of memory management, but I don't really know too much about that subject, which is why I'm asking here.

Also how to fix this would be nice, but if someone could explain these execution times I'd already be happy enough.

I already know of malloc/free, but the problem is not amount of memory used, it's merely execution time, so I don't know how that would help.

• @bokan it happens when the size is a multiple of the critical stride of the cache. – Luchian Grigore Sep 4 '12 at 14:03
• @Mysticial, it doesn't matter, it exposes same exact problem; code can be different, but basically both of the question ask about the same time (and their titles are definitely similar). – Griwes Sep 4 '12 at 14:09
• You should not process image using 2 dimension array if you want high performance. Consider all pixels being in a raw and process them like a one dimension array. Do this blur in two pass. First add value of surrounding pixels using a sliding sum of 3 pixels : slideSum+=src[i+1]-src[i-1]; dest[i]=slideSum;. Then do the same vertically and divide at same time : dest[i]=(src[i-width]+src[i]+src[i+width])/9. www-personal.engin.umd.umich.edu/~jwvm/ece581/18_RankedF.pdf – bokan Sep 4 '12 at 14:25
• There's actually two things going on here. It's not just super-alignment. – Mysticial Sep 4 '12 at 14:26
• (Just a minor nitpick on your answer. For the first code segment, it would be nice if all your for loops had braces.) – Trevor Boyd Smith Sep 5 '12 at 16:35

The difference is caused by the same super-alignment issue from the following related questions:

But that's only because there's one other problem with the code.

Starting from the original loop:

``````for(i=1;i<SIZE-1;i++)
for(j=1;j<SIZE-1;j++) {
res[j][i]=0;
for(k=-1;k<2;k++)
for(l=-1;l<2;l++)
res[j][i] += img[j+l][i+k];
res[j][i] /= 9;
}
``````

First notice that the two inner loops are trivial. They can be unrolled as follows:

``````for(i=1;i<SIZE-1;i++) {
for(j=1;j<SIZE-1;j++) {
res[j][i]=0;
res[j][i] += img[j-1][i-1];
res[j][i] += img[j  ][i-1];
res[j][i] += img[j+1][i-1];
res[j][i] += img[j-1][i  ];
res[j][i] += img[j  ][i  ];
res[j][i] += img[j+1][i  ];
res[j][i] += img[j-1][i+1];
res[j][i] += img[j  ][i+1];
res[j][i] += img[j+1][i+1];
res[j][i] /= 9;
}
}
``````

So that leaves the two outer-loops that we're interested in.

Now we can see the problem is the same in this question: Why does the order of the loops affect performance when iterating over a 2D array?

You are iterating the matrix column-wise instead of row-wise.

To solve this problem, you should interchange the two loops.

``````for(j=1;j<SIZE-1;j++) {
for(i=1;i<SIZE-1;i++) {
res[j][i]=0;
res[j][i] += img[j-1][i-1];
res[j][i] += img[j  ][i-1];
res[j][i] += img[j+1][i-1];
res[j][i] += img[j-1][i  ];
res[j][i] += img[j  ][i  ];
res[j][i] += img[j+1][i  ];
res[j][i] += img[j-1][i+1];
res[j][i] += img[j  ][i+1];
res[j][i] += img[j+1][i+1];
res[j][i] /= 9;
}
}
``````

This eliminates all the non-sequential access completely so you no longer get random slow-downs on large powers-of-two.

Core i7 920 @ 3.5 GHz

Original code:

``````8191: 1.499 seconds
8192: 2.122 seconds
8193: 1.582 seconds
``````

Interchanged Outer-Loops:

``````8191: 0.376 seconds
8192: 0.357 seconds
8193: 0.351 seconds
``````
• I'll also note that unrolling the inner loops has no effect on performance. The compiler probably does it automatically. I unrolled them for the sole purpose of getting rid of them to make it easier to spot the problem with the outer loops. – Mysticial Sep 4 '12 at 16:54
• And you can speed this code up by another factor of three by caching the sums along each row. But that and other optimizations are outside the scope of the original question. – Eric Postpischil Sep 4 '12 at 18:27
• @ClickUpvote This is actually a hardware (caching) issue. It has nothing to do with the language. If you tried it in any other language that compiles or JITs to native code, you would probably see the same effects. – Mysticial Sep 4 '12 at 20:02
• @ClickUpvote: You seem rather misguided. That "second loop" was just Mystical unrolling the inner loops by hand. This is something your compiler will almost certainly do anyway, and Mystical only did it to make the issue with the outer loops more obvious. It is by no means something you should bother doing yourself. – Lily Ballard Sep 4 '12 at 23:44
• THIS is a perfect example of a good answer on SO: References similar questions, explains step-by-step how you approached it, explains the problem, explains how to FIX the problem, has great formatting, and even an example of the code running on your machine. Thank you for your contribution. – MattSayar Sep 5 '12 at 3:11

The following tests have been done with Visual C++ compiler as it is used by the default Qt Creator install (I guess with no optimization flag). When using GCC, there is no big difference between Mystical's version and my "optimized" code. So the conclusion is that compiler optimizations take care off micro optimization better than humans (me at last). I leave the rest of my answer for reference.

It's not efficient to process images this way. It's better to use single dimension arrays. Processing all pixels is the done in one loop. Random access to points could be done using:

``````pointer + (x + y*width)*(sizeOfOnePixel)
``````

In this particular case, it's better to compute and cache the sum of three pixels groups horizontally because they are used three times each.

I've done some tests and I think it's worth sharing. Each result is an average of five tests.

Original code by user1615209:

``````8193: 4392 ms
8192: 9570 ms
``````

Mystical's version:

``````8193: 2393 ms
8192: 2190 ms
``````

Two pass using a 1D array: first pass for horizontal sums, second for vertical sum and average. Two pass addressing with three pointers and only increments like this:

``````imgPointer1 = &avg1;
imgPointer2 = &avg1[SIZE];
imgPointer3 = &avg1[SIZE+SIZE];

for(i=SIZE;i<totalSize-SIZE;i++){
resPointer[i]=(*(imgPointer1++)+*(imgPointer2++)+*(imgPointer3++))/9;
}

8193: 938 ms
8192: 974 ms
``````

Two pass using a 1D array and addressing like this:

``````for(i=SIZE;i<totalSize-SIZE;i++){
resPointer[i]=(hsumPointer[i-SIZE]+hsumPointer[i]+hsumPointer[i+SIZE])/9;
}

8193: 932 ms
8192: 925 ms
``````

One pass caching horizontal sums just one row ahead so they stay in cache:

``````// Horizontal sums for the first two lines
for(i=1;i<SIZE*2;i++){
hsumPointer[i]=imgPointer[i-1]+imgPointer[i]+imgPointer[i+1];
}
// Rest of the computation
for(;i<totalSize;i++){
// Compute horizontal sum for next line
hsumPointer[i]=imgPointer[i-1]+imgPointer[i]+imgPointer[i+1];
// Final result
resPointer[i-SIZE]=(hsumPointer[i-SIZE-SIZE]+hsumPointer[i-SIZE]+hsumPointer[i])/9;
}

8193: 599 ms
8192: 652 ms
``````

Conclusion:

• No benefits of using several pointers and just increments (I thought it would have been faster)
• Caching horizontal sums is better than computing them several time.
• Two pass is not three times faster, two times only.
• It's possible to achieve 3.6 times faster using both a single pass and caching an intermediary result

I'm sure it's possible to do much better.

NOTE Please, note that I wrote this answer to target general performance issues rather than the cache problem explained in Mystical's excellent answer. At the beginning it was just pseudo code. I was asked to do tests in the comments... Here is a completely refactored version with tests.

• "I think it's at least 3 times faster"—care to back up that claim with some metrics or citations? – Adam Rosenfield Sep 5 '12 at 4:27
• @AdamRosenfield "I think" = supposition != "It is" = claim. I have no metric for this and I would like to see a test. But mine require 7 increments, 2 sub, 2 add and one div per pixel. Each loop using less local var than there are register in CPU. The other require 7 increments, 6 decrements, 1 div and between 10 to 20 mul for addressing depending on compiler optimization. Also each instruction in the loop require the result of the previous instruction, this discard the benefits of super-scalar architecture of Pentiums. So it has to be faster. – bokan Sep 5 '12 at 9:39
• The answer to the original question is all about memory and cache effects. The reason that OP's code is so slow is that it its memory access pattern goes by columns instead of by rows, which has very poor cache locality of reference. It's particularly bad at 8192 because then consecutive rows end up using the same cache lines in a direct-mapped cache or cache with low associativity, so the cache miss rate is even higher. Interchanging the loops provides an enormous performance boost by greatly increasing cache locality. – Adam Rosenfield Sep 5 '12 at 19:42
• Well done, those are some impressive numbers. As you found, it's all about memory performance -- using several pointers with increments didn't provide any benefit. – Adam Rosenfield Sep 6 '12 at 15:59
• @AdamRosenfield I was quite worried this morning because I could not reproduce the tests. It appears that the performance increase is only with Visual C++ compiler. Using gcc, there's only a small difference. – bokan Sep 6 '12 at 19:50