Algebraic and topological properties of some sets in l1

Abstract

For a sequence x ∈ l1 c00, one can consider the set E(x) of all subsums of series Σn=1∞ x(n). Guthrie and Nymann proved that E(x) is one of the following types of sets: (I) a finite union of closed intervals; (C) homeomorphic to the Cantor set; (MC) homeomorphic to the set T of subsums of Σn=1∞ b(n) where b(2n-1) = 3/4n and b(2n) = 2/4n. By I, C and MC we denote the sets of all sequences x ∈ l1 c00, such that E(x) has the corresponding property. In this note we show that I and C are strongly c-algebrable and MC is c-lineable. We show that C is a dense Gδ-set in l1 and I is a true Fσ-set. Finally we show that I is spaceable while C is not spaceable.