Direct sums and products in topological groups and vector spaces

Abstract

We call a subset A of an abelian topological group G: (i) absolutely Cauchy summable provided that for every open neighbourhood U of 0 one can find a finite set F⊂eq A such that the subgroup generated by A F is contained in U; (ii) absolutely summable if, for every family \za:a∈ A\ of integer numbers, there exists g∈ G such that the net \Σa∈ F za a: F⊂eq A is finite\ converges to g; (iii) topologically independent provided that 0 ∈ A and for every neighbourhood W of 0 there exists a neighbourhood V of 0 such that, for every finite set F⊂eq A and each set \za:a∈ F\ of integers, Σa∈ Fzaa∈ V implies that zaa∈ W for all a∈ F. We prove that: (1) an abelian topological group contains a direct product (direct sum) of -many non-trivial topological groups if and only if it contains a topologically independent, absolutely (Cauchy) summable subset of cardinality ; (2) a topological vector space contains R(N) as its subspace if and only if it has an infinite absolutely Cauchy summable set; (3) a topological vector space contains RN as its subspace if and only if it has an R(N) multiplier convergent series of non-zero elements. We answer a question of Husek and generalize results by Bessaga-Pelczynski-Rolewicz, Dominguez-Tarieladze and Lipecki.