Chevet-type inequalities for subexponential Weibull variables and estimates for norms of random matrices

Abstract

We prove two-sided Chevet-type inequalities for independent symmetric Weibull random variables with shape parameter r∈[1,2]. We apply them to provide two-sided estimates for operator norms from pn to qm of random matrices (aibjXi,j)i m, j n, in the case when Xi,j's are iid symmetric Weibull variables with shape parameter r∈[1,2] or when X is an isotropic log-concave unconditional random matrix. We also show how these Chevet-type inequalities imply two-sided bounds for maximal norms from pn to qm of submatrices of X in both Weibull and log-concave settings.