Determinants of Random Block Hankel Matrices

Abstract

We consider the moment space Mp2n+1 of moments up to the order 2n + 1 of pn× pn real matrix measures defined on the interval [0,1]. The asymptotic properties of the Hankel determinant \ (Mi+jpn)i,j=0,…, nt\t∈ [0,1] of a uniformly distributed vector (M1,… ,M2n+1)t(M2n+1) are studied when the dimension n of the moment space and the size of the matrices pn converge to infinity. In particular weak convergence of an appropriately centered and standardized version of this process is established. Mod-Gaussian convergence is shown and several large and moderate deviation principles are derived. Our results are based on some new relations between determinants of subblocks of the Jacobi-beta-ensemble,which are of their own interest and generalize Bartlett decomposition-type results for the Jacobi-beta-ensemble from the literature.