Volume 9, Issue 3 (12-2023)
mmr 2023, 9(3): 235-250 |
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Nasrabadi E. (2n)-Weak Module Amenability of Triangular Banach Algebras on Semigroup Algebras. mmr 2023; 9 (3) :235-250
URL: http://mmr.khu.ac.ir/article-1-3203-en.html
URL: http://mmr.khu.ac.ir/article-1-3203-en.html
University of Birjand , nasrabadi@birjand.ac.ir
Abstract: (669 Views)
Let $S$ be a commutative (not necessary unital) inverse semigroup with the set of idempotents $E$. Consider semigroup algebras $ell^1(S)$ and $ell^1(E)$ and triangular Banach algebras $mathcal{T}=begin{bmatrix}ell^1(S) &ell^1(S) /M_0&ell^1(S)end{bmatrix}$ and $mathfrak{T}={begin{bmatrix}alpha &0&alphaend{bmatrix}: alpha in ell^1(E)]}$, where $M_0$ be the closed linear span of ${delta_{es}-delta_s: ein E, sin S}$. Recently, the author of this paper along with Pourabbas shown that for every $nin N$, $(2n+1)$-weak module amenability of $mathcal{T}} (as a $mathfrak{T}$-module) and $(2n+1)$-weak module amenability of $ell^1(S)} (as a $ell^1(E)$-module), are equal. In this paper, we extend this result and prove that the result is also true for the even state (2n)-weak module amenability, in the non-unitary state of these algebras.
Keywords: semigroup algebras, triangular Banach algebras, weak module amenability, first module cohomology group
Type of Study: Original Manuscript |
Subject:
Anal
Received: 2021/06/12 | Revised: 2024/02/19 | Accepted: 2022/05/28 | Published: 2024/01/8 | ePublished: 2024/01/8
Received: 2021/06/12 | Revised: 2024/02/19 | Accepted: 2022/05/28 | Published: 2024/01/8 | ePublished: 2024/01/8
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