Degree Complexity of Matrix Inversion
Abstract
For a q by q matrix x=(xi,j) we let J(x)=(xi,j-1) be the Hadamard inverse, which takes the reciprocal of the elements of x . We let I(x)=(xi,j)-1 denote the matrix inverse, and we define K=I J to be the birational map obtained from the composition of these two involutions. We consider the iterates Kn=K... K and determine degree complexity of K, which is the exponential rate of degree growth of the degrees of the iterates.
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