Arens Regularity And Factorization Property
Functional Analysis
2010-07-20 v1
Abstract
In this paper, we will study some Arens regularity properties of module actions. Let B be a Banach A−bimodule and let ZB∗∗ℓ(A∗∗) and ZA∗∗ℓ(B∗∗) be the topological centers of the left module action πℓ: A×B→B and the right module action πr: B×A→B, respectively. In this paper, we will extend some problems from topological center of second dual of Banach algebra A, Z1(A∗∗), into spaces ZB∗∗ℓ(A∗∗) and ZA∗∗ℓ(B∗∗). We investigate some relationships between Z1(A∗∗) and topological centers of module actions. For an unital Banach A−module B we show that ZA∗∗ℓ(B∗∗)Z1(A∗∗)=ZA∗∗ℓ(B∗∗) and as results in group algebras, for locally compact group G, we have ZL1(G)∗∗ℓ(M(G)∗∗)M(G)=ZL1(G)∗∗ℓ(M(G)∗∗) and ZM(G)∗∗ℓ(L1(G)∗∗)M(G)=ZM(G)∗∗ℓ(L1(G)∗∗). For Banach A−bimodule B, if we assume that B∗B∗∗⊆A∗, then B∗∗Z1(A∗∗)⊆ZA∗∗ℓ(B∗∗) and moreover if B is an unital as Banach A−module, then we conclude that B∗∗Z1(A∗∗)=ZA∗∗ℓ(B∗∗). Let ZA∗∗ℓ(B∗∗)A⊆B and suppose that B is WSC, so we conclude that ZA∗∗ℓ(B∗∗)=B. If B∗A=B∗ and B∗∗ has a left unit A∗∗−module, then ZB∗∗ℓ(A∗∗)=A∗∗. We will also establish some relationships of Arens regularity of Banach algebras A, B and Arens regularity of projective tensor product A⊗^B.
Cite
@article{arxiv.1007.3110,
title = {Arens Regularity And Factorization Property},
author = {Kazem Haghnejad Azar},
journal= {arXiv preprint arXiv:1007.3110},
year = {2010}
}