The Independence of p of the Lipscomb's L(A) Space Fractalized in lp(A)

Abstract

In one of our previous papers we proved that, for an infinite set A and p∈[1,∞), the embedded version of the Lipscomb's space L(A) in lp(A), p∈[1,∞), with the metric induced from lp(A), denoted by ωpA, is the attractor of an infinite iterated function system comprising affine transformations of lp(A). In the present paper we point out that ωpA=ωqA, for all p,q∈[1,∞) and, by providing a complete description of the convergent sequences from ωpA, we prove that the topological structure of ωpA is independent of p.