A wide class of examples of pretorsion theories and related remarks

Abstract

In this paper we construct a wide class of examples of pretorsion theories in the sense of A. Facchini, C. Finocchiaro, and M. Gran. Given a category C with a terminal object 1 and a category D with an initial object 0, we show that (C× 0,1×D) is a pretorsion theory in C×D if and only if each morphism 0 C in C is a monomorphism, and each morphism D 1 in D is an epimorphism. Here 0 denotes the set of initial objects in D and 1 denotes the set of terminal objects in C. We then remark that the result generalised to products of arbitrary pretorsion theories.

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