An extension to “A subsemigroup of the rook monoid”

Pub Date : 2023-10-19 DOI:10.1007/s00233-023-10393-8

George Fikioris, Giannis Fikioris

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Abstract

Abstract A recent paper studied an inverse submonoid $$M_{n}$$ M n of the rook monoid, by representing the nonzero elements of $$M_{n}$$ M n via certain triplets belonging to $${\mathbb {Z}}^3$$ Z 3 . In this note, we allow the triplets to belong to $${\mathbb {R}}^3$$ R 3 . We thus study a new inverse monoid $$\overline{M}_{n}$$ M ¯ n , which is a supermonoid of $$M_{n}$$ M n . We point out similarities and find essential differences. We show that $$\overline{M}_{n}$$ M ¯ n is a noncommutative, periodic, combinatorial, fundamental, completely semisimple, and strongly $${E}^{*}$$ E ∗ -unitary inverse monoid.

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“白嘴鸦单群的一个子半群”的推广

摘要本文研究了车单阵的一个逆子单阵$$M_{n}$$ mn，通过若干属于$${\mathbb {Z}}^3$$ z3的三元组来表示$$M_{n}$$ mn的非零元素。在本文中，我们允许三元组属于$${\mathbb {R}}^3$$ r3。因此，我们研究了一个新的逆单阵$$\overline{M}_{n}$$ M¯n，它是$$M_{n}$$ M n的超单阵。我们指出相似之处，找出本质的不同之处。我们证明$$\overline{M}_{n}$$ M¯n是一个非交换的、周期的、组合的、基本的、完全半简单的、强的$${E}^{*}$$ E * -酉逆单群。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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