A note on the spaces of variable integrability and summability of Almeida and H\"ast\"o

Abstract

We address an open problem posed recently by Almeida and H\"ast\"o in AlHa10. They defined the spaces of variable integrability and summability and showed that \|·|\| is a norm if q is constant almost everywhere or if x∈n1/p(x)+1/q(x) 1. Nevertheless, the natural conjecture (expressed also in AlHa10) is that the expression is a norm if p(x),q(x) 1 almost everywhere. We show, that \|·|\| is a norm, if 1 q(x) p(x) for almost every x∈n. Furthermore, we construct an example of p(x) and q(x) with (p(x),q(x)) 1 for every x∈n such that the triangle inequality does not hold for \|·|\|.