The Protasov-Zelenyuk topology and ideal convergence

Abstract

The so-called T-sequences u in a group G, and the related finest Hausdorff group topology T u on G that makes u a null sequence, were introduced by Protasov and Zelenyuk 35 years ago and since then they became a fundamental tool in the field of topological groups. More recently, in the abelian case, the subfamily of T-sequences called TB-sequences was introduced, as well as the finest precompact group topology Tpu that makes u a null sequence. Here we study the counterpart of all these notions with respect to ideal convergence in place of the classical notion of convergence of a sequence. Also, we study their relation to the already established field of I-characterized subgroups of compact abelian groups.

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