Lw∗wc and Rw∗wc and weak amenability of banach algebras
Publish place: Journal of Hyperstructures، Vol: 1، Issue: 2
Publish Year: 1391
Type: Journal paper
Language: English
View: 113
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Document National Code:
JR_JHSMS-1-2_006
Index date: 5 February 2024
Lw∗wc and Rw∗wc and weak amenability of banach algebras abstract
We introduce some new concepts as lef t − weak∗ − weak convergence property [Lw∗wc−property] and right−weak∗− weak convergence property [Rw∗wc−property] for Banach algebra A. Suppose that A ∗ and A ∗∗, respectively, have Rw∗wc−property and Lw∗wc−property, then if A ∗∗ is weakly amenable, it follows that A is weakly amenable. Let D : A → A ∗ be a surjective derivation. If D 00 is a derivation, then A is Arens regular.
Lw∗wc and Rw∗wc and weak amenability of banach algebras Keywords:
Amenability , weak amenability , derivation , Arens regularity , Topological centers , Module actions , Lef t − weak∗ − to − weak convergence
Lw∗wc and Rw∗wc and weak amenability of banach algebras authors
K. Haghnejad Azar
Department of Mathematics and Applications, Faculty of Mathematical Sciences, University of Mohaghegh Ardabili, P.O. Box ۵۶۱۹۹-۱۱۳۶۷, Ardabil, Iran.
Z. Ranjbar
Department of Mathematics and Applications, Faculty of Mathematical Sciences, University of Mohaghegh Ardabili, P.O. Box ۵۶۱۹۹-۱۱۳۶۷, Ardabil, Iran.