赫克-基塞尔曼单体的同一性

Pub Date : 2024-07-08 DOI:10.1007/s00233-024-10451-9

Magdalena Wiertel

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引用次数: 0

摘要

研究表明，当且仅当\({\text {HK}}_{\Theta }\) 没有自由非交换子半群时，与有限定向图\(\Theta \)相关联的赫克-基塞尔曼单体\({\text {HK}}_{\Theta }\) 满足半群同一性。由此可见，当K域上的半群代数\(K[{\text {HK}}_{\Theta }]\)满足多项式同一性时，这种情况就会发生。后者等价于用图形 \(\Theta \) 表示的条件。这个证明可以推导出这种单体 \({\text {HK}}_{\Theta }\) 所满足的具体同一性。

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Identities of Hecke–Kiselman monoids

It is shown that the Hecke–Kiselman monoid \({\text {HK}}_{\Theta }\) associated to a finite oriented graph \(\Theta \) satisfies a semigroup identity if and only if \({\text {HK}}_{\Theta }\) does not have free noncommutative subsemigroups. It follows that this happens exactly when the semigroup algebra \(K[{\text {HK}}_{\Theta }]\) over a field K satisfies a polynomial identity. The latter is equivalent to a condition expressed in terms of the graph \(\Theta \). The proof allows to derive concrete identities satisfied by such monoids \({\text {HK}}_{\Theta }\).

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