On General Closure Operators and Quasi Factorization Structures

Abstract

In this article the notions of (quasi weakly hereditary) general closure operator C on a category with respect to a class of morphisms, and quasi factorization structures in a category are introduced. It is shown that under certain conditions, if (, ) is a quasi factorization structure in , then has quasi right -factorization structure and quasi left -factorization structure. It is also shown that for a quasi weakly hereditary and quasi idempotent QCD-closure operator with respect to a certain class , every quasi factorization structure (, ) yields a quasi factorization structure relative to the given closure operator; and that for a closure operator with respect to a certain class , if the pair of classes of quasi dense and quasi closed morphisms forms a quasi factorization structure, then the closure operator is both quasi weakly hereditary and quasi idempotent. Several illustrative examples are furnished.