Diameter estimates for graph associahedra
Abstract
Graph associahedra are generalized permutohedra arising as special cases of nestohedra and hypergraphic polytopes. The graph associahedron of a graph encodes the combinatorics of search trees on , defined recursively by a root together with search trees on each of the connected components of . In particular, the skeleton of the graph associahedron is the rotation graph of those search trees. We investigate the diameter of graph associahedra as a function of some graph parameters. We give a tight bound of on the diameter of trivially perfect graph associahedra on edges. We consider the maximum diameter of associahedra of graphs on vertices and of given tree-depth, treewidth, or pathwidth, and give lower and upper bounds as a function of these parameters. We also prove that the maximum diameter of associahedra of graphs of pathwidth two is . Finally, we give the exact diameter of the associahedra of complete split and of unbalanced complete bipartite graphs.
Cite
@article{arxiv.2106.16130,
title = {Diameter estimates for graph associahedra},
author = {Jean Cardinal and Lionel Pournin and Mario Valencia-Pabon},
journal= {arXiv preprint arXiv:2106.16130},
year = {2022}
}
Comments
20 pages, 6 figures. Exact diameter proofs added for new classes of graph associahedra