On certain semigroups of finite monotone and order-decreasing partial transformations

Abstract

Let PMDn be the semigroup consisting of all monotone and order-decreasing partial transformations, and let IMDn be the subsemigroup of PMDn consisting of all injective monotone and order-decreasing transformations on the finite chain Xn=\ 1<·s<n \. For 2≤ r≤ n, let PMD(n,r) =\ α∈ PMDn : |im(α)| ≤ r\ and IMD(n,r)=\ α ∈ IMDn :|im(α)| ≤ r\. In this paper, we determine the cardinalities, maximal subsemigroups and ranks of PMD(n,r) and IMD(n,r), and moreover, we verify that the semigroups PMD(n,r) and IMD(n,r) are non-regular but abundant for any 2≤ r≤ n.