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So the obvious way to transpose a matrix is to use :

  for( int i = 0; i < n; i++ )

    for( int j = 0; j < n; j++ )

      destination[j+i*n] = source[i+j*n];

but I want something that will take advantage of locality and cache blocking. I was looking it up and can't find code that would do this, but I'm told it should be a very simple modification to the original. Any ideas?

Edit: I have a 2000x2000 matrix, and I want to know how can I change the code using two for loops, basically splitting the matrix into blocks that I transpose individually, say 2x2 blocks, or 40x40 blocks, and see which block size is most efficient.

Edit2: The matrices are stored in column major order, that is to say for a matrix

a1 a2    
a3 a4

is stored as a1 a3 a2 a4.

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6 Answers 6

up vote 25 down vote accepted

You're probably going to want four loops - two to iterate over the blocks, and then another two to perform the transpose-copy of a single block. Assuming for simplicity a block size that divides the size of the matrix, something like this I think, although I'd want to draw some pictures on the backs of envelopes to be sure:

for (int i = 0; i < n; i += blocksize) {
    for (int j = 0; j < n; j += blocksize) {
        // transpose the block beginning at [i,j]
        for (int k = i; k < i + blocksize; ++k) {
            for (int l = j; l < j + blocksize; ++l) {
                dst[k + l*n] = src[l + k*n];
            }
        }
    }
}

An important further insight is that there's actually a cache-oblivious algorithm for this (see http://en.wikipedia.org/wiki/Cache-oblivious_algorithm, which uses this exact problem as an example). The informal definition of "cache-oblivious" is that you don't need to experiment tweaking any parameters (in this case the blocksize) in order to hit good/optimal cache performance. The solution in this case is to transpose by recursively dividing the matrix in half, and transposing the halves into their correct position in the destination.

Whatever the cache size actually is, this recursion takes advantage of it. I expect there's a bit of extra management overhead compared with your strategy, which is to use performance experiments to, in effect, jump straight to the point in the recursion at which the cache really kicks in, and go no further. On the other hand, your performance experiments might give you an answer that works on your machine but not on your customers' machines.

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So if we have a 7 by 7 matrix with a blocksize of 2 will this code break, edge-case wise? –  user635832 Mar 4 '11 at 23:47
1  
@user635832: yes it will, because the bounds on k and l are i+2 and j+2, which for the blocks all around the right-bottom edges will overrun the actual matrix by a margin of 1 because i or j will be 6. Simplest fix is to bound k by k < i+blocksize && k < n, and the same for l. Unless I've missed something or messed it up - I haven't tested this code at all. –  Steve Jessop Mar 4 '11 at 23:50
    
It's weird, I was testing this code, and it seems to work, but actually runs slower with the cache efficiency then without. Maybe 2000x2000 matrices are too small for the efficiency gain? –  user635832 Mar 4 '11 at 23:59
    
@user63582: You don't say the type of the matrix, but at 16MB a good proportion of the matrix fits in L3 cache on a typical intel-based machine, so yes, could be too small. Or maybe I've got it wrong, and this block-wise transposition isn't that great for cache. I think it should be, with a blocksize of around 64 bytes squared, but I may be confused or it may be the compiler does a good enough job with the original code and memory pre-fetching. Are you at max optimization, and do you have a profiler on that counts cache misses, to prove whether it's actually cache-efficient or not? –  Steve Jessop Mar 5 '11 at 0:00
1  
Oh, and if this is implemented as a function, have you marked the pointer parameters src and dst as restrict? If you have then at least in principle, the compiler can re-order the copies for itself in ways that it can't do when there's a possibility that src and dst overlap. Chances are, it knows more about your hardware than you do. –  Steve Jessop Mar 5 '11 at 0:09

Instead of transposing the matrix in memory, why not collapse the transposition operation into the next operation you're going to do on the matrix?

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1  
Definitely worth considering. One nice way is to make an object that presents a "view" over the original matrix, like a view in a database. –  j_random_hacker Mar 5 '11 at 4:31

A normal matrix is typically not that huge. A 4x4 matrix for example, assuming 4-byte floats, would be 64 bytes. A common cache line size is 128 bytes... so if you have a matrix inside one cache line, you get one cache miss at the most.

Assuming that's not an option, you can try to read as sequentially as possible (i.e. try to get to the second half of the matrix later, so swap the two indices in your inner loop), and prefetch the second half if it's not aligned.

But really, if you're trying to look for efficient matrix operations, you'll have to use SIMD. Doing some cache magic here sounds like optimizing at the wrong end.

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Well my matrix is 2000x2000, but I was told that I could add two for loops to the code above and get a solution that was much more cache efficient, but I don't understand how to do that. I just want to see how I can optimize this particular code. –  user635832 Mar 4 '11 at 23:28
    
Ah okay, ignore what I said then :) Well, at the very least I would swap out i+j*n and j+i*n to make sure that you're reading sequentially, and prefetch the next page, but I would probably need to ponder over this a bit more. –  EboMike Mar 4 '11 at 23:30
    
Oh also it might help to know that the matrices themselves are stored in column-major order. –  user635832 Mar 4 '11 at 23:33

Matrix multiplication comes to mind, but the cache issue there is much more pronounced, because each element is read N times.

With matrix transpose, you are reading in a single linear pass and there's no way to optimize that. But you can simultaneously process several rows so that you write several columns and so fill complete cache lines. You will only need three loops.

Or do it the other way around and read in columns while writing linearly.

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With a large matrix, possibly a large sparse matrix, it might be an idea to decompose it into smaller cache friendly chunks (Say, 4x4 sub matrices). You can also flag sub matrices as identity which will help you in creating optimized code paths.

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I had the exact same problem yesterday. I ended up with this solution:

void transpose(double*dst,const double*src,size_t n)noexcept{
    size_t block=0,size=8;
    for(block=0;block+size-1<n;block+=size){
        for(size_t i=block;i<block+size;++i){
            for(size_t j=i;j<block+size;++j){
                dst[i*n+j]=src[j*n+i];
                dst[j*n+i]=src[i*n+j];}}
        for(size_t i=block+size;i<n;++i){
            for(size_t j=block;j<block+size;++j){
                dst[i*n+j]=src[j*n+i];
                dst[j*n+i]=src[i*n+j];}}}
    for(size_t i=block;i<n;++i){
        for(size_t j=i;j<n;++j){
            dst[i*n+j]=src[j*n+i];
            dst[j*n+i]=src[i*n+j];}}}

I did some testing and 8 seems to be the sweet spot on my architecture (Intel E5-2690v2). As the cache line is 64 bytes on this architecture, it is really what would be expected (64/sizeof(double)==8).

This is 4 time faster than the obvious solution on my machine.

This solution takes care of a matrix with a size which is not a multiple of the block size.

if dst and src are the same matrix an in place function should really be used instead:

void transpose(double*m,size_t n)noexcept{
    size_t block=0,size=8;
    for(block=0;block+size-1<n;block+=size){
        for(size_t i=block;i<block+size;++i){
            for(size_t j=i+1;j<block+size;++j){
                std::swap(m[i*n+j],m[j*n+i]);}}
        for(size_t i=block+size;i<n;++i){
            for(size_t j=block;j<block+size;++j){
                std::swap(m[i*n+j],m[j*n+i]);}}}
    for(size_t i=block;i<n;++i){
        for(size_t j=i+1;j<n;++j){
            std::swap(m[i*n+j],m[j*n+i]);}}}

I used C++11 but this could be easily translated in other languages.

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