compute determinant using Cholesky decomposition
Show older comments
I need to compute determinant of a positive definite, hermitian matrix in fastest way for my code. So the best way is to compute by cholesky decomposition, but on writing code for it there is no improvement over MATLAB built-in function "det" which is based on LU decomposition (more complex than cholskey). Can anyone help, can we modify matlab buit-in function "chol" to determine determinant from it directly.
2 Comments
Gaurav Gupta
on 14 Jun 2012
youtha
on 5 Jan 2019
Try using
:)
L=chol(A)
p=1;
for i=1:n
p=p*L(i,i)^2
end
Answers (2)
Walter Roberson
on 13 Jun 2012
0 votes
Keep in mind that for sufficiently large matrices, MATLAB is going to invoke multi-threaded library code that has been heavily optimized for the target architectures. (It doesn't do that for smaller matrices because there is notable overhead in re-arranging the arrays into the form required by those libraries.)
Teja Muppirala
on 14 Jun 2012
You could try
prod(diag(chol(A)))^2
But I have no idea if/when this would be faster than simply det(A).
1 Comment
Gaurav Gupta
on 14 Jun 2012
Categories
Find more on Linear Algebra in Help Center and File Exchange
on 13 Jun 2012
on 5 Jan 2019
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
