Combinatorial results for zero-divisors regarding right zero elements of order-preserving transformations

Abstract

For any positive integer n, let On be the semigroup of all order-preserving full transformations on Xn=\1<·s <n\. For any 1≤ k≤ n, let πk∈ On be the constant map defined by xπk=k for all x∈ Xn. In this paper, we introduce and study the sets of left, right, and two-sided zero-divisors of πk: eqnarray* Lk &=& \ α∈ On:αβ=πk for some β∈ On \πk\ \, Rk &=& \ α∈ On:γα=πk for some \ γ∈ On\πk\ \, \ and \ Zk=Lk Rk. eqnarray* We determine the structures and cardinalities of Lk, Rk and Zk for each 1≤ k≤ n. Furthermore, we compute the ranks of R1,\, Rn,\, Z1,\, Zn and Lk for each 1≤ k≤ n, because these are significant subsemigroups of On.