Original Articles

EPIREFLECTIONS VERSUS BIREFLECTIONS FOR TOPOLOGICAL FUNCTORS

Published in: Quaestiones Mathematicae
Volume 8 , issue 1 , 1985 , pages: 47–61

DOI: 10.1080/16073606.1985.9631900

Author(s): Gabriele Castellini Dept. of Mathematics, U.S.A.

Keywords: 18A22 , 22A05

Abstract

In this paper it is proved that if T: A → X is a topological functor satisfying certain conditions, then there is a Galois Connection between the class of bireflective subcategories of A and the class of epireflective subcategories of A that are not bireflective and that are contained in the subcategory of separated objects of A. In general such a correspondence is not bijective.

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