Multiplicative norm convergence in Banach lattice f-algebras

Abstract

A net (xα) in an f-algebra E is called multiplicative order convergent to x∈ E if xα-x u 0 for all u∈ E+. This convergence has been investigated and applied in a recent paper by Aydn AAydn. In this paper, we study a variation of this convergence for Banach lattice f-algebras. A net (xα) in a Banach lattice f-algebra E is said to be multiplicative norm convergent to x∈ E if xα-x u 0 for each u∈ E+. We study on this concept and investigate its relationship with the other convergences, and also we introduce the mn-topology Banach lattice f-algebras.