SI2-quasicontinuous spaces
Abstract
In this paper, as a common generalization of SI2-continuous spaces and s2-quasicontinuous posets, we introduce the concepts of SI2-quasicontinuous spaces and GD-convergence of nets for arbitrary topological spaces by the cuts. Some characterizations of SI2-quasicontinuity of spaces are given. The main results are: (1) a space is SI2-quasicontinuous if and only if its weakly irreducible topology is hypercontinuous under inclusion order; (2) A T0 space X is SI2-quasicontinuous if and only if the GD-convergence in X is topological.
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