An Element φ-δ-Primary to another Element in Multiplicative Lattices

Abstract

In this paper, we introduce an element φ-δ-primary to another element in a compactly generated multiplicative lattice L and obtain its characterizations. We prove many of its properties and investigate the relations between these structures. By a counter example, it is shown that if an element b∈ L is φ-δ-primary to a proper element p∈ L then b need not be δ-primary to p and found conditions under which an element b∈ L is δ-primary to a proper element p∈ L if b is φ-δ-primary to p.