On T-characterized subgroups of compact Abelian groups

Abstract

We say that a subgroup H of an infinite compact Abelian group X is T-characterized if there is a T-sequence u =\un \ in the dual group of X such that H=\x∈ X: \; (un, x) 1 \. We show that a closed subgroup H of X is T-characterized if and only if H is a Gδ-subgroup of X and the annihilator of H admits a Hausdorff minimally almost periodic group topology. All closed subgroups of an infinite compact Abelian group X are T-characterized if and only if X is metrizable and connected. We prove that every compact Abelian group X of infinite exponent has a T-characterized subgroup which is not an Fσ-subgroup of X that gives a negative answer to Problem 3.3 in [10].