On the algebraic structure of the Schr\"oder monoid

Abstract

Let [n] be a finite chain \1, 2, …, n\, and let LSn be the semigroup consisting of all isotone and order-decreasing partial transformations on [n]. Moreover, let SSn = \α ∈ LSn : \, 1 ∈ Dom α\ be the subsemigroup of LSn, consisting of all transformations in LSn each of whose domain contains 1. For 1 ≤ p ≤ n, let K(n,p) = \α ∈ LSn : \, |Im \, α| ≤ p\ and M(n,p) = \α ∈ SSn : \, |Im α| ≤ p\ be the two-sided ideals of LSn and SSn, respectively. Furthermore, let RLSn(p) and RSSn(p) denote the Rees quotients of K(n,p) and M(n,p), respectively. It is shown in this article that for any S ∈ \SSn, LSn, RLSn(p), RSSn(p)\, S is abundant and idempotent generated for all values of n. Moreover, the ranks of the Rees quotients RLSn(p) and RSSn(p) are shown to be equal to the ranks of the two-sided ideals K(n,p) and M(n,p), respectively. Finally, these ranks are computed to be Σk=pn nk k-1p-1 and n-1p-12n-p, respectively.

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