On $k$-connected-homogeneous graphs
Abstract
A graph is -connected-homogeneous (-CH) if is a positive integer and any isomorphism between connected induced subgraphs of order at most extends to an automorphism of , and connected-homogeneous (CH) if this property holds for all . Locally finite, locally connected graphs often fail to be 4-CH because of a combinatorial obstruction called the unique property; we prove that this property holds for locally strongly regular graphs under various purely combinatorial assumptions. We then classify the locally finite, locally connected 4-CH graphs. We also classify the locally finite, locally disconnected 4-CH graphs containing 3-cycles and induced 4-cycles, and prove that, with the possible exception of locally disconnected graphs containing 3-cycles but no induced 4-cycles, every finite 7-CH graph is CH.
Cite
@article{arxiv.1805.03115,
title = {On $k$-connected-homogeneous graphs},
author = {Alice Devillers and Joanna B. Fawcett and Cheryl E. Praeger and Jin-Xin Zhou},
journal= {arXiv preprint arXiv:1805.03115},
year = {2020}
}
Comments
32 pages, 2 figures, some minor revisions