On topological properties of the group of the null sequences valued in an Abelian topological group

Abstract

Following [23], denote by F0 the functor on the category TAG of all Hausdorff Abelian topological groups and continuous homomorphisms which passes each X∈ TAG to the group of all X-valued null sequences endowed with the uniform topology. We prove that if X∈ TAG is an (E)-space (respectively, a strictly angelic space or a S-space), then F0 (X) is an (E)-space (respectively, a strictly angelic space or a S-space). We study respected properties for topological groups in particular from categorical point of view. Using this investigation we show that for a locally compact Abelian (LCA) group X the following are equivalent: 1) X is totally disconnected, 2) F0 (X) is a Schwartz group, 3) F0 (X) respects compactness, 4) F0(X) has the Schur property. So, if a LCA group X has non-zero connected component, the group F0(X) is a reflexive non-Schwartz group which does not have the Schur property. We prove also that for every compact connected metrizable Abelian group X the group F0 (X) is monothetic that generalizes a result by Rolewicz for X=T.