Some Characterizations for Approximate Biflatness of Semigroup Algebras

IF 0.7 Q2 MATHEMATICS Muenster Journal of Mathematics Pub Date : 2023-05-27 DOI:10.1155/2023/9961772
N. Razi, A. Sahami
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Abstract

In this paper, we study an approximate biflatness of l 1 S , where S is a Clifford semigroup. Indeed, we show that a Clifford semigroup algebra l 1 S is approximately biflat if and only if every maximal subgroup of S is amenable, E S is locally finite, and l 1 S has an approximate identity in c 00 S . Moreover, we prove that l 1 S is approximately biflat if and only if each maximal subgroup of S is amenable for an inverse semigroup S such that E S , the set of its idempotent elements, is totally ordered and locally finite.
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半群代数近似双平坦性的几个刻画
在本文中,我们研究了1 S的近似双平坦性,其中S是Clifford半群。的确,证明了Clifford半群代数l1s是近似双平的当且仅当每S的极大子群是可服从的,es是局部有限的,11s近似等价于c 00 S。此外,证明s1是近似双平面的当且仅当的每个极大子群S可以满足逆半群S,使得E S,它的幂等元素的集合,是完全有序和局部有限的。
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