Tutte Polynomials of Symmetric Hyperplane Arrangements
Hery Randriamaro

TL;DR
This paper extends the study of Tutte polynomials from graphs and specific hyperplane arrangements to a broader class called symmetric hyperplane arrangements, providing a unified approach to compute these polynomials for various known arrangements.
Contribution
It introduces symmetric hyperplane arrangements and derives a general method to compute their Tutte polynomials, unifying previous results for specific arrangements.
Findings
Computed Tutte polynomials for symmetric hyperplane arrangements.
Derived Tutte polynomials for Catalan, Shi threshold, and rrangements.
Unified framework for various hyperplane arrangements.
Abstract
Originally in 1954 the Tutte polynomial was a bivariate polynomial associated to a graph in order to enumerate the colorings of this graph and of its dual graph at the same time. However the Tutte polynomial reveals more of the internal structure of a graph, and contains even other specializations from other sciences like the Jones polynomial in Knot theory, the partition function of the Pott model in statistical physics, and the reliability polynomial in network theory. In this article, we study the Tutte polynomial associated to more general objects which are the arrangements of hyperplanes. Indeed determining the Tutte polynomial of a graph is equivalent to determining the Tutte polynomial of a special hyperplane arrangement called graphic arrangement. In 2007 Ardila computed the Tutte polynomials of the hyperplane arrangements associated to the classical Weyl groups, and the…
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Taxonomy
TopicsAdvanced Combinatorial Mathematics · Advanced Mathematical Identities · Bayesian Methods and Mixture Models
