Probabilistic results for monoids of order-preserving transformations

Abstract

Let POn be the monoid of all order-preserving partial transformations on Xn=\1,…, n\ with the natural order, and let On and POIn denote its submonoids of order-preserving full and injective partial transformations, respectively. For each transformation α∈POn, write the random variables Y(α)=|α| and Yr(α)=|α| given that |α|=r for 0 ≤slant r ≤slant n. We determine the probability distribution, expectation and variance of Yr and Y for POn and POIn. In particular, Yr(α) follows a hypergeometric distribution H(n+r-1,n,r) for α ∈ POn, while Yr(α) is degenerate and Y(α) follows a hypergeometric distribution H(2n,n,n) for α ∈ POIn.