Rosenthal's inequalities: -norms and quasi-Banach symmetric sequence spaces

Abstract

Let X be a symmetric quasi-Banach function space with Fatou property and let E be an arbitrary symmetric quasi-Banach sequence space. Suppose that (fk)k≥0⊂ X is a sequence of independent random variables. We present a necessary and sufficient condition on X such that the quantity \|\ \|Σk=0nfkek\|E\ \|X admits an equivalent characterization in terms of disjoint copies of (fk)k=0n for every n 0; in particular, we obtain the deterministic description of \|\ \|Σ k=0nfkek\|_q\ \|Lp for all 0<p,q<∞, which is the ultimate form of Rosenthal's inequality. We also consider the case of a -normed symmetric function space X, defined via an Orlicz function satisfying the 2-condition. That is, we provide a formula for E-valued -moments, namely the quantity E((\|(fk)k≥0 \|E )), in terms of the sum of disjoint copies of fk, k≥0.