Rings of functions whose closure of discontinuity set is in an ideal of closed sets

Abstract

Let P be an ideal of closed subsets of a topological space X. Consider the ring, C(X)P of real valued functions on X whose closure of discontinuity set is a member of P. We investigate the ring properties of C(X)P for different choices of P, such as the 0-self injectivity and regularity of the ring, if and when the ring is Artinian and/or Noetherian. The concept of FP-space was introduced by Z. Gharabaghi, M. Ghirati and A. Taherifar in 2018 in a paper published in Houston Journal of Mathematics. In this paper, they established a result stating that every P-space is a FP-space. We furnish that this theorem might fail if X is not Tychonoff and we provide a suitable counter example to prove our assertion.