# Determinant of a complex matrix in R

Is there a way to calculate the determinant of a complex matrix?

``````F4<-matrix(c(1,1,1,1,1,1i,-1,-1i,1,-1,1,-1,1,-1i,-1,1i),nrow=4)
det(F4)
Error in determinant.matrix(x, logarithm = TRUE, ...) :
determinant not currently defined for complex matrices

library(Matrix)
determinant(Matrix(F4))
Error in Matrix(F4) :
complex matrices not yet implemented in Matrix package
Error in determinant(Matrix(F4)) :
error in evaluating the argument 'x' in selecting a method for function 'determinant'
``````
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If you use prod(eigen(F4)\$values) I'd recommend `prod(eigen(F4, only.values=TRUE)\$values)`

Note that the `qr()` is advocated to use iff you are only interested in the absolute value or rather `Mod()` :

`````` prod(abs(Re(diag(qr(x)\$qr))))
``````

gives the `Mod(determinant(x))`
{In X = QR, |det(Q)|=1 and the diagonal of R is real (in R at least).}

BTW: Did you note the caveat

Often, computing the determinant is not what you should be doing to solve a given problem.

on the help(determinant) page ?

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If you know that the characteristic polynomial of a matrix A splits into linear factors, then det(A) is the product of the eigenvalues of A, and you can use eigen value functions like this to work around your problem. I suspect you'll still want something better, but this might be a start.

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For the time being I also use prod(eigen(F4)\$values) – George Dontas Jul 19 '10 at 18:12