Combinatorial interpretations of Tutte polynomials at the point (2,-1)
Abstract
Let G be a simple connected graph, and let TG(x,y) be the Tutte polynomial of G. Motivated by the works in Ma, we, in this paper, introduce the even-left spanning forests of G and odd G-partitionable permutations, and show that TG(2,-1) is equal to both the number of even-left spanning forests of G and the number of odd G-partitionable permutations. In particular, for a complete graph Kn, we prove that TKn(2,-1) is the number of alternating permutations on \1,2,…,n+1\, using two distinct techniques: a recurrence relation and an explicit bijection construction.
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