Combinatorially interpreting generalized Stirling numbers

Abstract

Let w be a word in alphabet \x,D\ with m x's and n D's. Interpreting "x" as multiplication by x, and "D" as differentiation with respect to x, the identity wf(x) = xm-nΣk Sw(k) xk Dk f(x), valid for any smooth function f(x), defines a sequence (Sw(k))k, the terms of which we refer to as the Stirling numbers (of the second kind) of w. The nomenclature comes from the fact that when w=(xD)n, we have Sw(k)=n k, the ordinary Stirling number of the second kind. Explicit expressions for, and identities satisfied by, the Sw(k) have been obtained by numerous authors, and combinatorial interpretations have been presented. Here we provide a new combinatorial interpretation that retains the spirit of the familiar interpretation of n k as a count of partitions. Specifically, we associate to each w a quasi-threshold graph Gw, and we show that Sw(k) enumerates partitions of the vertex set of Gw into classes that do not span an edge of Gw. We also discuss some relatives of, and consequences of, our interpretation, including q-analogs and bijections between families of labelled forests and sets of restricted partitions.