On pure complex spectrum for truncations of random orthogonal matrices and Kac polynomials

Abstract

Let O(2n+) be the group of orthogonal matrices of size (2n+)× (2n+) equipped with the probability distribution given by normalized Haar measure. We study the probability equation* p2n() = P[M2n \, has no real eigenvalues], equation* where M2n is the 2n× 2n left top minor of a (2n+)×(2n+) orthogonal matrix. We prove that this probability is given in terms of a determinant identity minus a weighted Hankel matrix of size n× n that depends on the truncation parameter . For =1 the matrix coincides with the Hilbert matrix and we prove equation* p2n(1) n-3/8, when n ∞. equation* We also discuss connections of the above to the persistence probability for random Kac polynomials.