Quasi Divisor Topology of Modules over Domains

Abstract

Let E be a module over a domain A, and W(E)\#=W(E)-ann(E) where W(E)=\a∈ A:aE≠ E\. We define an equivalence relation on W(E)\# as follows: a b if and only if aE=bE for any a,b∈ W(E)\# and denote EC(W(E)\#) to be the set of all equivalence classes [a] of W(E)\#. We first show that the family \Ua\a∈ W(E)\# generates a topology which we called the quasi divisor topology of A-module E denoted by qDA(E) where Ua=\[b]∈ EC(W(E)\#):\ aE⊂eq bE\ for every a∈ W(E)\#. This paper examines the connections between topological properties of the quasi divisor topology qDA(E) and algebraic properties of A-module E. These include each separation axioms, compactness, connectedness and first and second countability. Also, we characterize some important class of rings/modules such as divisible modules and uniserial modules by means of qDA(E). Furthermore, we introduce quasi second modules and study its algebraic properties to decide when qDA(E) is a T1-space.