Set Convergences via bornology

Abstract

This paper examines the equivalence between various set convergences, as studied in [7, 13, 22], induced by an arbitrary bornology S on a metric space (X,d). Specifically, it focuses on the upper parts of the following set convergences: convergence deduced through uniform convergence of distance functionals on S (τS,d-convergence); convergence with respect to gap functionals determined by S (GS,d-convergence); and bornological convergence (S-convergence). In particular, we give necessary and sufficient conditions on the structure of the bornology S for the coincidence of τS,d+-convergence with GS,d+-convergence, as well as τS,d+-convergence with S+-convergence. A characterization for the equivalence of τS,d+-convergence and S+-convergence, in terms of certain convergence of nets, has also been given earlier by Beer, Naimpally, and Rodriguez-Lopez in [13]. To facilitate our study, we first devise new characterizations for τS,d+-convergence and S+-convergence, which we call their miss-type characterizations.

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