Limit theorems for mixed-norm sequence spaces with applications to volume distribution

Abstract

Let p, q ∈ (0, ∞] and pm(qn) be the mixed-norm sequence space of real matrices x = (xi, j)i ≤ m, j ≤ n endowed with the (quasi-)norm x p, q := ( (xi, j)j ≤ n q )i ≤ m p. We shall prove a Poincar\'e-Maxwell-Borel lemma for suitably scaled matrices chosen uniformly at random in the pm(qn) unit balls Bp, qm, n, and obtain both central and non-central limit theorems for their p(q)-norms. We use those limit theorems to study the asymptotic volume distribution in the intersection of two mixed-norm sequence balls. Our approach is based on a new probabilistic representation of the uniform distribution on Bp, qm, n.