Stability and complexity of mixed discriminants

Abstract

We show that the mixed discriminant of n positive semidefinite n × n real symmetric matrices can be approximated within a relative error ε >0 in quasi-polynomial nO( n - ε) time, provided the distance of each matrix to the identity matrix in the operator norm does not exceed some absolute constant γ0 >0. We deduce a similar result for the mixed discriminant of doubly stochastic n-tuples of matrices from the Marcus - Spielman - Srivastava bound on the roots of the mixed characteristic polynomial. Finally, we construct a quasi-polynomial algorithm for approximating the sum of m-th powers of principal minors of a matrix, provided the operator norm of the matrix is strictly less than 1. As is shown by Gurvits, for m=2 the problem is \#P-hard and covers the problem of computing the mixed discriminant of positive semidefinite matrices of rank 2.