Infinite dimensional spaces consisting of sequences that do not converge to zero

Abstract

Given a map f E F between Banach spaces (or Banach lattices), a set A of E-valued bounded sequences, x ∈ A and a vector topology τ on F, we investigate the existence of an infinite dimensional Banach space (or Banach lattice) containing a subsequence of x and consisting, up to the origin, of sequences (xj)j=1∞ belonging to A such that (f(xj))j=1∞ does not converge to zero with respect to τ. The applications we provide encompass the improvement of known results, as well as new results, concerning Banach spaces/Banach lattices not satisfying classical properties and linear/nonlinear maps not belonging to well studied classes.