A class of (2m-1)-weakly amenable Banach algebras
الموضوعات :
1 - Department of Mathematics, Faculty of Basic Sciences, Imam Ali University, Tehran, Iran
الکلمات المفتاحية: Banach algebras, cohomology group, weakly amenable,
ملخص المقالة :
Let ${\A}$ be a Banach space and ${\lambda}$ be a non-zero fixed element of ${\A}^{\ast}$(dual space of ${\A}$) with non-zero kernel. Defining algebra product in $\A$ as $a\cdot b=\lambda(a)b$ for $a,b\in {\A}$, we show that ${\A}$ is a $(2m-1)$-weakly amenable Banach algebra but not $2m$-weakly amenable for any $m\in{\N}$. Furthermore, we show the converse of the statement [2,~Proposition\,1.4.(ii)] ``for a non-unital Banach algebra $\A$, if $\A$ is weakly amenable then $\A^{\#}$ is weakly amenable" does not hold.
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