The expected degree of noninvertibility of compositions of functions and a related combinatorial identity

Abstract

Recently, Defant and Propp [2020] defined the degree of noninvertibility of a function f X Y between two finite nonempty sets by deg(f)=1|X|Σx∈ X|f-1(f(x))|. We obtain an exact formula for the expected degree of noninvertibility of the composition of t functions for every t∈ N. An equivalent formulation for the definition of the degree of noninvertibility is then the starting point for a generalization yielding a seemingly new combinatorial identity involving the Stirling transform of the signed Stirling numbers of the first kind.