Paper read at the Symposium on Categorical Algebra and Topology University of Cape Town 29 June—3 July 1981

POWERS AND EXPONENTIAL OBJECTS IN INITIALLY STRUCTURED CATEGORIES AND APPLICATIONS TO CATEGORIES OF LIMIT SPACES

Published in: Quaestiones Mathematicae
Volume 6 , issue 1-3 , 1983 , pages: 227–254

DOI: 10.1080/16073606.1983.9632302

Author(s): Friedhelm Schwarz , Federal Republic of Germany

Keywords: 54C35 , 18D15.

Abstract

Generalizing results of Herrlich and Nel, the author characterizes by means of smallest proper structures those objects X of an initially structured category for which X x—has a right adjoint, and describes the corresponding function spaces. It is shown that reduction to finally and initially dense classes is possible. The results are applied to epireflective subcategories of the category of limit spaces containing a finite non-indiscrete space, in particular to epireflective subcategories of TOP.

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