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I wrote two Matrix Multiplications programs in C++: Regular MM (source), and Strassen's MM (source), both of which operate on square matrices of sizes 2^k x 2^k(in other words, square matrices of even size).

Results are just terrible. For 1024 x 1024 matrix, Regular MM takes 46.381 sec, while Strassen's MM takes 1484.303 sec (25 minutes !!!!).

I attempted to keep the code as simple as possible. Other Strassen's MM examples found on the web are not that much different from my code. One issue with Strassen's code is obvious - I don't have cutoff point, that switches to regular MM.

What other issues my Strassen's MM code has ???

Thanks !

Direct links to sources
http://pastebin.com/HqHtFpq9
http://pastebin.com/USRQ5tuy

Edit1. Fist, a lot of great advices. Thank you for taking your time and sharing knowledge.

I implemented changes(kept all of my code), added cut-off point. MM of 2048x2048 matrix, with cutoff 512 already gives good results. Regular MM: 191.49s Strassen's MM: 112.179s Significant improvement. Results were obtained on prehistoric Lenovo X61 TabletPC with Intel Centrino processor, using Visual Studio 2012. I will do more checks(to make sure I got the correct results), and will publish the results.

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@LuchianGrigore: Oh, that's subtle. And likely also a big part of the problem. Probably a bigger issue than the one I identified actually. –  Omnifarious Nov 26 '12 at 7:17
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@Mysticial I assumed one of the algorithms was cache oblivious, since the dimensions were fixed to 2^k. Might be wrong. –  Luchian Grigore Nov 26 '12 at 7:20
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@LuchianGrigore: One algorithm is dead-simple (and not cache oblivious). The other is also not cache-oblivious, though it's supposed to be a LOT faster. –  Omnifarious Nov 26 '12 at 7:23
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@LuchianGrigore: Unfortunately, I believe that Strassen's algorithm is a recursive divide-and-conquer algorithm. I suspect it can be made to work for non-powers of 2. But I also suspect that the OPs implementation does not. –  Omnifarious Nov 26 '12 at 7:26
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@newprint well then, the reason is the one explained here –  Luchian Grigore Nov 26 '12 at 7:29

2 Answers 2

up vote 16 down vote accepted

One issue with Strassen's code is obvious - I don't have cutoff point, that switches to regular MM.

It's fair to say that recursing down to 1 point is the bulk of (if not the entire) problem. Trying to guess at other performance bottlenecks without addressing this is almost moot due to the massive performance hit that it brings. (In other words, you're comparing Apples to Oranges.)

As discussed in the comments, cache alignment could have an effect, but not to this scale. Furthemore, cache alignment would likely hurt the regular algorithm more than the Strassen algorithm since the latter is cache-oblivious.

void strassen(int **a, int **b, int **c, int tam) {

    // trivial case: when the matrix is 1 X 1:
    if (tam == 1) {
            c[0][0] = a[0][0] * b[0][0];
            return;
    }

That's far too small. While the Strassen algorithm has a smaller complexity, it has a much bigger Big-O constant. For one, you have function call overhead all the way down to 1 element.

This is analogous to using merge or quick sort and recursing all the way down to one element. To be efficient you need to stop the recursion when the size gets small and fall back to the classic algorithm.

In quick/merge sort, you'd fall back to a low-overhead O(n^2) insertion or selection sort. Here you would fall back to the normal O(n^3) matrix multiply.


The threshold which you fall back the classic algorithm should be a tunable threshold that will likely vary depending on the hardware and the ability of the compiler to optimize the code.

For something like Strassen multiplication where the advantage is only O(2.8074) over the classic O(n^3), don't be surprised if this threshold turns out to be very high. (thousands of elements?)


In some applications there can be many algorithms each with decreasing complexity but increasing Big-O. The result is that multiple algorithms become optimal at different sizes.

Large integer multiplication is a notorious example of this:

*Note these example thresholds are approximate and can vary drastically - often by more than a factor of 10.

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This is one of the reasons I love StackOverflow. With one question I was shown real world examples where subtle effects that can create performance problems were magnified and demonstrated in an obvious way. And then, of course, this answer is very likely what's causing the algorithm that should be faster to be slower. –  Omnifarious Nov 26 '12 at 7:46
    
I tested, and for the naive algorithm the problem I fingered is significant. But it should affect both algorithms significantly and so probably isn't the reason for the poor performance of the supposedly faster algorithm. –  Omnifarious Nov 26 '12 at 8:27
    
@Omnifarious Yeah, I'd expect the power-of-two alignment penalties to be no more than a factor of 3. Since all four major examples of it on SO have only about 3x performance hit. Here the OP has something like 30x performance difference. –  Mysticial Nov 26 '12 at 8:32
    
Your cutoffs are really far too high. –  tmyklebu Nov 26 '12 at 8:33
    
@tmyklebu Which cutoffs? –  Mysticial Nov 26 '12 at 8:33

So, there may be more problems that this, but your first problem is that you're using arrays of pointers to arrays. And since you're using array sizes that are powers of 2, this is an especially big performance hit over allocating the elements contiguously and using integer division to fold the long array of numbers into rows.

Anyway, that's my first guess as to a problem. As I said, there may be more, and I'll add to this answer as I discover them.

Edit: This likely only contributes a small amount to the problem. The problem is likely the one Luchian Grigore refers to involving cache line contention issues with powers of two.

I verified that my concern is valid for the naive algorithm. The time for the naive algorithm goes down by almost 50% if the array is contiguous instead. Here is the code for this (using a SquareMatrix class that is C++11 dependent) on pastebin.

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Thank you for your help! I will take a look at your code in the morning. –  newprint Nov 26 '12 at 8:59
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@newprint: I made a couple of small errors that have no effect on your code but make the SquareMatrix class not safe for general use. I will fix them. –  Omnifarious Nov 26 '12 at 9:05
    
here simpe version- void madd(int N, int Xpitch, const double X[], int Ypitch, const double Y[], int Spitch, double S[]) { for (int i = 0; i < N; i++) for (int j = 0; j < N; j++) S[i*Spitch + j] = X[i*Xpitch + j] + Y[i*Ypitch + j]; –  newprint Nov 26 '12 at 15:58
    
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@newprint: I don't like that version as you have to remember to use the multiply with every matrix access. But it is very nicely C-ish and uses no C++ features at all. :-) My version (with its inline functions) allows the compiler to make some interesting assumptions and do some really nice optimizations while allowing the actual multiply algorithm to still appear to cleanly use multi-dimensional array access. –  Omnifarious Nov 26 '12 at 16:12

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