Assfaw, F.SHolgate, D2021-04-152021-04-152021Assfaw, F.S., & Holgate, D. (2021). Codenseness and openness with respect to an interior operator. Applied Categorical Structures ,29(2), 235-2480927-285210.1007/s10485-020-09614-whttp://hdl.handle.net/10566/6051Working in an arbitrary category endowed with a fixed (E, M) -factorization system such that M is a fixed class of monomorphisms, we first define and study a concept of codense morphisms with respect to a given categorical interior operator i. Some basic properties of these morphisms are discussed. In particular, it is shown that i-codenseness is preserved under both images and dual images under morphisms in M and E, respectively. We then introduce and investigate a notion of quasi-open morphisms with respect to i. Notably, we obtain a characterization of quasi i-open morphisms in terms of i-codense subobjects. Furthermore, we prove that these morphisms are a generalization of the i-open morphisms that are introduced by Castellini. We show that every morphism which is both i-codense and quasi i-open is actually i-open. Examples in topology and algebra are also provided.enCodensenessInterior operatorOpennessQuasi-opennessCodenseness and openness with respect to an interior operatorArticle