Multitriangulations and tropical Pfaffians
Abstract
The -associahedron is the simplicial complex of -crossing-free subgraphs of the complete graph with vertices on a circle. Its facets are called -triangulations. We explore the connection of with the Pfaffian variety of antisymmetric matrices of rank . First, we characterize the Gr\"obner cone producing as initial ideal of the Stanley-Reisner ideal of (that is, the monomial ideal generated by -crossings). This implies that -triangulations are bases in the algebraic matroid of , a matroid closely related to low-rank completion of antisymmetric matrices. We then look at the tropicalization of and show that embeds naturally as the intersection of and , and is contained in the totally positive part of it. We show that for and for each triangulation of the -gon, the projection of this embedding of to the coordinates corresponding to diagonals in gives a complete polytopal fan, realizing the associahedron. This fan is linearly isomorphic to the -vector fan of the cluster algebra of type , shown to be polytopal by Hohlweg, Pilaud and Stella in (2018).
Cite
@article{arxiv.2203.04633,
title = {Multitriangulations and tropical Pfaffians},
author = {Luis Crespo Ruiz and Francisco Santos},
journal= {arXiv preprint arXiv:2203.04633},
year = {2024}
}
Comments
33 pages. Edited, incorporating suggestions from a journal