@article {
author = {Ghaderi, Eghbal and Naseri, Saber},
title = {Some notions of $(\sigma, \tau)-$amenability for unitization of Banach algebras},
journal = {Computational Methods for Differential Equations},
volume = {7},
number = {Issue 4 (Special Issue)},
pages = {573-579},
year = {2019},
publisher = {University of Tabriz},
issn = {2345-3982},
eissn = {2383-2533},
doi = {},
abstract = {Let $\mathcal A$ be a Banach algebra and $\sigma$ and $\tau$ be continuous endomorphisms on $\mathcal A$. In this paper, we investigate $(\sigma, \tau)-$amenability and$(\sigma, \tau)-$weak amenability for unitization of Banach algebras, and also the relation between of them.We introduce and study the concepts $(\sigma, \tau)-$trace extention property, $(\sigma, \tau)-I-$weak amenability and $(\sigma, \tau)-$ideal amenability for $\mathcal A$ and its unitization, where $I$ is a closed two-sided ideal in $\mathcal A$.},
keywords = {Convolutional neural network,identification,Machine learing},
url = {https://cmde.tabrizu.ac.ir/article_9206.html},
eprint = {https://cmde.tabrizu.ac.ir/article_9206_be620afb824433d40b99035ff0d2affb.pdf}
}