نویسندگان | Ebrahim Nasrabadi |
---|---|
نشریه | Sahand Communications in Mathematical Analysis |
شماره صفحات | 73-84 |
شماره سریال | 18 |
شماره مجلد | 2 |
نوع مقاله | Full Paper |
تاریخ انتشار | 2021 |
رتبه نشریه | ISI |
نوع نشریه | چاپی |
کشور محل چاپ | ایران |
چکیده مقاله
For a discrete semigroup $ S $ and a left multiplier operator $T$ on $S$, there is a new induced semigroup $S_{T}$, related to $S$ and $T$. In this paper, we show that if $T$ is multiplier and bijective, then the second module cohomology groups $\HH_{\ell^1(E)}^{2}(\ell^1(S), \ell^{\infty}(S))$ and $\HH_{\ell^1(E_{T})}^{2}(\ell^1({S_{T}}), \ell^{\infty}(S_{T}))$ are equal, where $E$ and $E_{T}$ are subsemigroups of idempotent elements in $S$ and $S_{T}$, respectively. Finally, we show thet, for every odd $n\in\mathbb{N}$, $\HH_{\ell^1(E_{T})}^{2}(\ell^1(S_{T}),\ell^1(S_{T})^{(n)})$ is a Banach space, when $S$ is a commutative inverse semigroup.
tags: second module cohomology group, inverse semigroup, induced semigroup, semigroup algebra