Vertex subsets with minimal width and dual width in $Q$-polynomial distance-regular graphs
Combinatorics
2021-11-02 v1
Abstract
We study -polynomial distance-regular graphs from the point of view of what we call descendents, that is to say, those vertex subsets with the property that the width and dual width satisfy , where is the diameter of the graph. We show among other results that a nontrivial descendent with is convex precisely when the graph has classical parameters. The classification of descendents has been done for the 5 classical families of graphs associated with short regular semilattices. We revisit and characterize these families in terms of posets consisting of descendents, and extend the classification to all of the 15 known infinite families with classical parameters and with unbounded diameter.
Cite
@article{arxiv.1011.2000,
title = {Vertex subsets with minimal width and dual width in $Q$-polynomial distance-regular graphs},
author = {Hajime Tanaka},
journal= {arXiv preprint arXiv:1011.2000},
year = {2021}
}
Comments
31 pages