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can anyone tell me which is the best algorithm to find the value of determinant of a matrix of size nXn.

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Do we know more about the matrix other than the size. Is it sparse? – wcm Mar 12 '10 at 19:15
Despite the tagging the answers to… are language agnostic, so I propose that this is a duplicate. – dmckee Mar 12 '10 at 19:42
Matrix algorithms are sufficiently complex so that you ought not implement them yourself; use a well-established library like LAPACK. The people who write the library will already have chosen the best implementation for determinant (probably LU decomposition for a dense matrix). – Rex Kerr Mar 12 '10 at 22:35
What algorithm does numpy use? – Bolt64 Sep 23 '13 at 12:26

Here is an extensive discussion.

There are a lot of algorithms.

One simple one is to take the LU decomposition. Then, since

 det M = det LU = det L * det U

and both L and U are triangular, the determinant is a product of the diagonal elements of L and U. That is O(n^3). There are more efficient algorithms.

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If you did an initial research, you've probably found that with N>=4, calculation of a matrix determinant becomes quite complex. Regarding algorithms, I would point you to Wikipedia article on Matrix determinants, specifically the "Algorithmic Implementation" section.

From my own experience, you can easily find a LU or QR decomposition algorithm in existing matrix libraries such as Alglib. The algorithm itself is not quite simple though.

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I am not too familiar with LU factorization, but I know that in order to get either L or U, you need to make the initial matrix triangular (either upper triangular for U or lower triangular for L). However, once you get the matrix in triangular form for some nxn matrix A and assuming the only operation your code uses is Rb - k*Ra, you can just solve det(A) = Π T(i,i) from i=0 to n (i.e. det(A) = T(0,0) x T(1,1) x ... x T(n,n)) for the triangular matrix T. Check this link to see what I'm talking about.

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