Khinchin inequality and Banach-Saks type properties in rearrangement-invariant spaces

Abstract

We study the class of all rearrangement-invariant (=r.i.) function spaces E on [0,1] such that there exists 0<q<1 for which Σ_k=1nkE≤ Cnq, where \k\k 1⊂ E is an arbitrary sequence of independent identically distributed symmetric random variables on [0,1] and C>0 does not depend on n. We completely characterize all Lorentz spaces having this property and complement classical results of Rodin and Semenov for Orlicz spaces exp(Lp), p 1. We further apply our results to the study of Banach-Saks index sets in r.i. spaces.