I'm trying to calculate the inverse matrix in Java.

I'm following the adjoint method (first calculation of the adjoint matrix, then transpose this matrix and finally, multiply it for the inverse of the value of the determinant).

It works when the matrix is not too big. I've checked that for matrixes up to a size of 12x12 the result is quickly provided. However, when the matrix is bigger than 12x12 the time it needs to complete the calculation increases exponentially.

The matrix I need to invert is 19x19, and it takes too much time. The method that more time consumes is the method used for the calculation of the determinant.

The code I'm using is:

```
public static double determinant(double[][] input) {
int rows = nRows(input); //number of rows in the matrix
int columns = nColumns(input); //number of columns in the matrix
double determinant = 0;
if ((rows== 1) && (columns == 1)) return input[0][0];
int sign = 1;
for (int column = 0; column < columns; column++) {
double[][] submatrix = getSubmatrix(input, rows, columns,column);
determinant = determinant + sign*input[0][column]*determinant(submatrix);
sign*=-1;
}
return determinant;
}
```

Does anybody know how to calculate the determinant of a large matrix more efficiently? If not, does anyone knows how to calcultate the inverse of a large matrix using other algorithm?

Thanks

requireexponential time. – jk. Jan 2 '10 at 20:31U) and then det(A) = det(L)det(U). – dedalo Jan 2 '10 at 20:53