Bridges and random truncations of random matrices

Abstract

We continue to study the squared Frobenius norm of a submatrix of a n × n random unitary matrix. When the choice of the submatrix is deterministic and its size is [ns] × [nt], we proved in a previous paper that, after centering and without any rescaling, the two-parameter process converges in distribution to a bivariate Brownian bridge. Here, we consider Bernoulli independent choices of rows and columns with respective parameters s and t. We prove by subordination that after centering and rescaling by n-1/2, the process converges to another Gaussian process.