On (p,r)-null sequences and their relatives

Abstract

Let 1≤ p < ∞ and 1≤ r ≤ p, where p is the conjugate index of p. We prove an omnibus theorem, which provides numerous equivalences for a sequence (xn) in a Banach space X to be a (p,r)-null sequence. One of them is that (xn) is (p,r)-null if and only if (xn) is null and relatively (p,r)-compact. This equivalence is known in the "limit" case when r=p, the case of the p-null sequence and p-compactness. Our approach is more direct and easier than those applied for the proof of the latter result. We apply it also to characterize the unconditional and weak versions of (p,r)-null sequences.