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?

interface, not a robustimplementation, 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