Action preserving (weak) topologies on the category of presheaves

Abstract

Let C be a finitely complete small category. In this paper, first we construct two weak (Lawvere-Tierney) topologies on the category of presheaves. One of them is established by means of a subfunctor of the Yoneda functor and the other one, is constructed by an admissible class on C and the internal existential quantifier in the presheaf topos C. Moreover, by using an admissible class on C, we are able to define an action on the subobject classifier of C. Then we find some necessary conditions for that the two weak topologies and also the double negation topology on C to be action preserving maps. Finally, among other things, we constitute an action preserving weak topology on C.