Hypergraph polynomials and the Bernardi process
Abstract
Recently O. Bernardi gave a formula for the Tutte polynomial of a graph, based on spanning trees and activities just like the original definition, but using a fixed ribbon structure to order the set of edges in a different way for each tree. The interior polynomial is a generalization of to hypergraphs. We supply a Bernardi-type description of using a ribbon structure on the underlying bipartite graph . Our formula works because it is determined by the Ehrhart polynomial of the root polytope of in the same way as is. To prove this we interpret the Bernardi process as a way of dissecting the root polytope into simplices, along with a shelling order. We also show that our generalized Bernardi process gives a common extension of bijections (and their inverses) constructed by Baker and Wang between spanning trees and break divisors.
Cite
@article{arxiv.1810.00812,
title = {Hypergraph polynomials and the Bernardi process},
author = {Tamás Kálmán and Lilla Tóthmérész},
journal= {arXiv preprint arXiv:1810.00812},
year = {2021}
}
Comments
46 pages