Tutte Polynomial Activities
Abstract
Unlike Whitney's definition of the corank-nullity generating function , Tutte's definition of his now eponymous polynomial requires a total order on the edges of which the polynomial is a posteriori independent. Tutte presented his definition in terms of internal and external activities of maximal spanning forests. Although Tutte's original definition may appear somewhat ad hoc upon first inspection, subsequent work by various researchers has demonstrated that activity is a deep combinatorial concept. In this survey, we provide an introduction to activities for graphs and matroids. Our primary goal is to survey several notions of activity for graphs which admit expansions of the Tutte polynomial. Additionally, we describe some fundamental structural theorems, and outline connections to the topological notion of shellability as well as several topics in algebraic combinatorics.
Keywords
Cite
@article{arxiv.1906.02781,
title = {Tutte Polynomial Activities},
author = {Spencer Backman},
journal= {arXiv preprint arXiv:1906.02781},
year = {2019}
}
Comments
18 pages, 6 figures. This is a draft of a chapter for the Handbook on the Tutte Polynomial. Comments are welcome!