Eulerian Polynomials for Digraphs
Abstract
Given an n-vertex digraph D and a labeling σ:V(D) [n], we say that an arc u v of D is a descent of σ if σ(u)>σ(v). Foata and Zeilberger introduced a generating function AD(t) for labelings of D weighted by descents, which simultaneously generalizes both Eulerian polynomials and Mahonian polynomials. Motivated by work of Kalai, we look at problems related to -1 evaluations of AD(t). In particular, we give a combinatorial interpretation of |AD(-1)| in terms of "generalized alternating permutations" whenever the underlying graph of D is bipartite.
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