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I have implemented one matrix multiplication with boost::numeric::ublas::matrix (see my full, working boost code)

Result result = read ();

boost::numeric::ublas::matrix<int> C;
C = boost::numeric::ublas::prod(result.A, result.B);

and another one with the standard algorithm (see full standard code):

vector< vector<int> > ijkalgorithm(vector< vector<int> > A, 
                                    vector< vector<int> > B) {
    int n = A.size();

    // initialise C with 0s
    vector<int> tmp(n, 0);
    vector< vector<int> > C(n, tmp);

    for (int i = 0; i < n; i++) {
        for (int k = 0; k < n; k++) {
            for (int j = 0; j < n; j++) {
                C[i][j] += A[i][k] * B[k][j];
    return C;

This is how I test the speed:

time boostImplementation.out > boostResult.txt
diff boostResult.txt correctResult.txt

time simpleImplementation.out > simpleResult.txt
diff simpleResult.txt correctResult.txt

Both programs read a hard-coded textfile which contains two 2000 x 2000 matrices. Both programs were compiled with these flags:

g++ -std=c++98 -Wall -O3 -g $(PROBLEM).cpp -o $(PROBLEM).out -pedantic

I got 15 seconds for my implementation and over 4 minutes for the boost-implementation!

edit: After compiling it with

g++ -std=c++98 -Wall -pedantic -O3 -D NDEBUG -DBOOST_UBLAS_NDEBUG library-boost.cpp -o library-boost.out

I got 28.19 seconds for the ikj-algorithm and 60.99 seconds for Boost. So Boost is still considerably slower.

Why is boost so much slower than my implementation?

share|improve this question
The only time reinventing the wheel is a good idea is when you can make a better wheel... – Mysticial Jun 19 '12 at 22:52
Boost.uBLAS is meant to be a standard interface, not a robust implementation, so do not expect it to be fast unless you're using e.g. the LAPACK back-end. – ildjarn Jun 19 '12 at 22:54
Boost uBLAS has some optional debug checking that will slow things down. See this FAQ, and check preprocessor macros BOOST_UBLAS_NDEBUG and NDEBUG – TJD Jun 19 '12 at 22:56
Though it shouldn't take 4 minutes to read a couple of 2k-by-2k matrices. – Mysticial Jun 19 '12 at 22:58
@Mysticial tricky part is that most people reinventing the wheel are generally convinced that it's better regardless of whether it actually is or not, or else they probably wouldn't be doing it in the first place. :-D – stinky472 Jun 19 '12 at 23:18

2 Answers 2

up vote 36 down vote accepted

Slower performance of the uBLAS version can be partly explained by debugging features of the latter as was pointed out by TJD.

Here's the time taken by the uBLAS version with debugging on:

real    0m19.966s
user    0m19.809s
sys     0m0.112s

Here's the time taken by the uBLAS version with debugging off (-DNDEBUG -DBOOST_UBLAS_NDEBUG compiler flags added):

real    0m7.061s
user    0m6.936s
sys     0m0.096s

So with debugging off, uBLAS version is almost 3 times faster.

Remaining performance difference can be explained by quoting the following section of uBLAS FAQ "Why is uBLAS so much slower than (atlas-)BLAS":

An important design goal of ublas is to be as general as possible.

This generality almost always comes with a cost. In particular the prod function template can handle different types of matrices, such as sparse or triangular ones. Fortunately uBLAS provides alternatives optimized for dense matrix multiplication, in particular, axpy_prod and block_prod. Here are the results of comparing different methods:

ijkalgorithm   prod   axpy_prod  block_prod
   1.335       7.061    1.330       1.278

As you can see both axpy_prod and block_prod are somewhat faster than your implementation. Measuring just the computation time without I/O, removing unnecessary copying and careful choice of the block size for block_prod (I used 64) can make the difference more profound.

See also uBLAS FAQ and Effective uBlas and general code optimization.

share|improve this answer
Could you run the same test using the version OP provided? – mfontanini Jun 20 '12 at 0:08
@mfontanini: Sure, I updated the answer. Note that I used smaller (1000x1000) random matrices so all the times are smaller. – vitaut Jun 20 '12 at 0:15
Thanks for testing it. +1 :D – mfontanini Jun 20 '12 at 0:21

I believe, your compiler doesn't optimize enough. uBLAS code makes heavy use of templates and templates require heavy use of optimizations. I ran your code through MS VC 7.1 compiler in release mode for 1000x1000 matrices, it gives me

10.064s for uBLAS

7.851s for vector

The difference is still there, but by no means overwhelming. uBLAS's core concept is lazy evaluation, so prod(A, B) evaluates results only when needed, e.g. prod(A, B)(10,100) will execute in no time, since only that one element will actually be calculated. As such there's actually no dedicated algorithm for whole matrix multiplication which could be optimized (see below). But you could help the library a little, declaring

matrix<int, column_major> B;

will reduce running time to 4.426s which beats your function with one hand tied. This declaration makes access to memory more sequential when multiplying matrices, optimizing cache usage.

P.S. Having read uBLAS documentation to the end ;), you should have found out that there's actually a dedicated function to multiply whole matrices at once. 2 functions - axpy_prod and opb_prod. So

opb_prod(A, B, C, true);

even on unoptimized row_major B matrix executes in 8.091 sec and is on par with your vector algorithm

P.P.S. There's even more optimizations:

C = block_prod<matrix<int>, 1024>(A, B);

executes in 4.4s, no matter whether B is column_ or row_ major. Consider the description: "The function block_prod is designed for large dense matrices." Choose specific tools for specific tasks!

share|improve this answer
As I already commented, on my machine/compiler combination (VS 9), fully optimizing, the op's boost version actually runs faster than the vector version, when only timing the computation (no IO). From disassembly, I'd guess the vector version could have been inlined/streamlined better by gcc, with for-loop unfolding etc. On the other hand, vector < vector > needs several allocations (optimizations possible?), where boost can use one for the whole matrix. – dyp Jun 22 '12 at 8:59
Both times look large to me, on my machine vector version takes just 1.3 seconds for 1000x1000 random matrix. What machine are you testing on? – vitaut Jun 22 '12 at 15:03
@vitaut, It's a Pentium M 1600 notebook :) – panda-34 Jun 22 '12 at 15:12
+1 From my measurements, I now can conclude: using iterators instead of integers + element access is 3x faster on VC9 but not faster on g++(4.6.2). ikj-algorithm applied to boost matrices is slower than vector+iterators (6x on MSVC and 10x on gcc) no matter if using iterators or not. block_prod is as fast as vector+iterators with both compilers. Timing has been made roughly and excludes both IO and allocations. – dyp Jun 23 '12 at 16:08

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