Sorting probability for large Young diagrams

Abstract

For a finite poset P=(X,), let LP denote the set of linear extensions of P. The sorting probability δ(P) is defined as \[δ(P) \, := \, x,y∈ X \, | P \, [L(x)≤ L(y) ] \ - \ P \, [L(y)≤ L(x) ] |\,, \] where L ∈ LP is a uniform linear extension of P. We give asymptotic upper bounds on sorting probabilities for posets associated with large Young diagrams and large skew Young diagrams, with bounded number of rows.