Laplacian Simplices Associated to Digraphs
Abstract
We associate to a finite digraph a lattice polytope whose vertices are the rows of the Laplacian matrix of . This generalizes a construction introduced by Braun and the third author. As a consequence of the Matrix-Tree Theorem, we show that the normalized volume of equals the complexity of , and contains the origin in its relative interior if and only if is strongly connected. Interesting connections with other families of simplices are established and then used to describe reflexivity, -polynomial, and integer decomposition property of in these cases. We extend Braun and Meyer's study of cycles by considering cycle digraphs. In this setting we characterize reflexivity and show there are only four non-trivial reflexive Laplacian simplices having the integer decomposition property.
Keywords
Cite
@article{arxiv.1710.00252,
title = {Laplacian Simplices Associated to Digraphs},
author = {Gabriele Balletti and Takayuki Hibi and Marie Meyer and Akiyoshi Tsuchiya},
journal= {arXiv preprint arXiv:1710.00252},
year = {2020}
}