The monoid of monotone and decreasing partial transformations on a finite chain

Abstract

In this article, we consider the monoid of all monotone and order-decreasing partial transformations denoted as DORPn on an n ordered chain [n]=\1, …,n\, its two-sided ideal I(n,p)= \ ∈ DORPn : \, |Im \, | ≤ p\ and the Rees quotient RQp(n) of the ideal I(n,p). We compute the order of the monoid DORPn and show that for any semigroup S in \DORPn, \, I(n,p), \, RQp(n)\, S is abundant for all values of n. In particular, we show that the Rees quotient RQp(n), is a non-regular 0-*bisimple abundant semigroup. In addition, we compute the ranks of the Rees quotient RQp(n) and the two-sided ideal I(n,p). Finally, the rank of DORPn is determined to be 3n-2.

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