Operator pq norms of random matrices with iid entries

Abstract

We prove that for every p,q∈[1,∞] and every random matrix X=(Xi,j)i m, j n with iid centered entries satisfying the regularity assumption \|Xi,j\|2 α \|Xi,j\| for every 1, the expectation of the operator norm of X from pn to qm is comparable, up to a constant depending only on α, to \[ m1/qt∈ Bpn\|Σj=1ntjX1,j\| q Log m +n1/p*s∈ Bq*m\|Σi=1m siXi,1\| p* Log n. \] We give more explicit formulas, expressed as exact functions of p, q, m, and n, for the asymptotic operator norms in the case when the entries Xi,j are: Gaussian, Weibullian, log-concave tailed, and log-convex tailed. In the range 1 q 2 p we provide two-sided bounds under a weaker regularity assumption (E X1,14)1/4≤ α (E X1,12)1/2.