Algebraic properties of the ring C(X)P

Abstract

Our aim is to study certain algebraic properties of the ring C(X)P of real-valued functions on X whose closure of discontinuity set is in an ideal of closed sets. We characterize PP-spaces using z-ideals and essential ideals of C(X)P and also almost PP-spaces using z0-ideals of C(X)P and a topology finer than the original topology on X. We deduce that each maximal ideal of C(X)F GGT2018 (resp. T'(X) A2010) is a z0-ideal. We establish that the notions of clean ring, weakly clean ring, semiclean ring, almost clean ring and exchange ring coincide in the ring C(X)P. End of this paper, we also characterize PP-spaces and almost PP-spaces using certain ideals having depth zero. We exhibit a condition on P under which prime and essential ideals of C(X)P have depth zero.