On the prime spectrum of an le-module

Abstract

Here we continue to characterize a recently introduced notion, le-modules RM over a commutative ring R with unity Bhuniya. This article introduces and characterizes Zariski topology on the set Spec(M) of all prime submodule elements of M. Thus we extend many results on Zariski topology for modules over a ring to le-modules. The topological space Spec(M) is connected if and only if R/Ann(M) contains no idempotents other than 0 and 1. Open sets in the Zariski topology for the quotient ring R/Ann(M) induces a base of quasi-compact open sets for the Zariski-topology on Spec(M). Every irreducible closed subset of Spec(M) has a generic point. Besides, we prove a number of different equivalent characterizations for Spec(M) to be spectral.