Transformations of polynomial ensembles

Abstract

A polynomial ensemble is a probability density function for the position of n real particles of the form 1Zn \, Πj<k (xk-xj) \, [ fk (xj) ]j,k=1n, for certain functions f1, …, fn. Such ensembles appear frequently as the joint eigenvalue density of random matrices. We present a number of transformations that preserve the structure of a polynomial ensemble. These transformations include the restriction of a Hermitian matrix by removing one row and one column, a rank-one modification of a Hermitian matrix, and the extension of a Hermitian matrix by adding an extra row and column with complex Gaussians.