On the cocartesian image of preorders and equivalence relations in regular categories

Abstract

In a regular category E, the direct image along a regular epimorphism f of a preorder is not a preorder in general. In Set, its best preorder approximation is then its cocartesian image above f. In a regular category, the existence of such a cocartesian image above f of a preorder S is actually equivalent to the existence of the supremum R[f] S among the preorders. We investigate here some conditions ensuring the existence of these cocartesian images or equivalently of these suprema. They applied to two very dissimilar contexts: any topos E with suprema of chains of subobjects or any n-permutable regular category.