Abstract

Abstract We show that each non-trivial epireflective subcategory of the topological or pretopological spaces fails to be cartesian closed. Motivated by this “negative” result, we consider the supercategory of pseudotopological spaces and obtain: An epireflective subcategory of the pseudotopological spaces which contains a finite non-indiscrete space is cartesian closed iff it is closed with respect to powers in the pseudotopological spaces. Here the density property that every pseudotopological space is a final epi-sink of free ultraspaces is essential.

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