The Independence of p of the Lipscomb's L(A) Space Fractalized in l^{p}(A)

Details The Independence of p of the Lipscomb's L(A) Space Fractalized in l^{p}(A) The Independence of p of the Lipscomb's L(A) Space Fractalized in l^{p}(A)

2011-10-14

arxiv.org/abs/1110.3168v1

Mathematics

Dynamical Systems

Scientific paper

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

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