The Probability That All Eigenvalues are Real for Products of Truncated Real Orthogonal Random Matrices

Abstract

The probability that all eigenvalues of a product of m independent N × N sub-blocks of a Haar distributed random real orthogonal matrix of size (Li+N) × (Li+N), (i=1,…,m) are real is calculated as a multi-dimensional integral, and as a determinant. Both involve Meijer G-functions. Evaluation formulae of the latter, based on a recursive scheme, allow it to be proved that for any m and with each Li even the probability is a rational number. The formulae furthermore provide for explicit computation in small order cases.