Journal of Mathematics (Jan 2025)
A Study of Generalized Differential Identities via Prime Ideals
Abstract
Let R be a ring and P be a prime ideal of R. The aim of this research paper is to delve into the relationship between the structural properties of the quotient ring R/P and the behavior of generalized derivations in a ring R endowed with an involution. Precisely, the study focuses on characterizing generalized derivations in the ring R that are associated with prime ideals and satisfy certain functional identities. The investigation seeks to uncover how these derivations interact with the quotient ring structure and the implications for the underlying ring theory. The key objective is to explore the relationship between a structure and a map, a topic that has proven to be highly significant. Moreover, we offer an example to show that the numerous conditions outlined in the hypotheses of our theorems are reasonable and not overly stringent.
