Products of topological groups in which all closed subgroups are separable

Abstract

We prove that if H is a topological group such that all closed subgroups of H are separable, then the product G× H has the same property for every separable compact group G. Let c be the cardinality of the continuum. Assuming 2ω1 = c, we show that there exist: (1) pseudocompact topological abelian groups G and H such that all closed subgroups of G and H are separable, but the product G× H contains a closed non-separable σ-compact subgroup; (2) pseudocomplete locally convex vector spaces K and L such that all closed vector subspaces of K and L are separable, but the product K× L contains a closed non-separable σ-compact vector subspace.