Nice vertices in cubic graphs
Abstract
A subgraph of a graph is nice if has a perfect matching. Nice subgraphs play a vital role in the theory of ear decomposition and matching minors of matching covered graphs. A vertex of a cubic graph is nice if and its neighbors induce a nice subgraph. D. Kr\'{a}l et al. (2010) [9] showed that each vertex of a cubic brick is nice. It is natural to ask how many nice vertices a matching covered cubic graph has. In this paper, using some basic results of matching covered graphs, we prove that if a non-bipartite cubic graph is 2-connected, then has at least 4 nice vertices; if is 3-connected and , then has at least 6 nice vertices. We also determine all the corresponding extremal graphs. For a cubic bipartite graph with bipartition , a pair of vertices and is called a nice pair if and together with their neighbors induce a nice subgraph. We show that a connected cubic bipartite graph is a brace if and only if each pair of vertices in distinct color classes is a nice pair. In general, we prove that has at least 9 nice pairs of vertices and is the only extremal graph.
Cite
@article{arxiv.2508.21471,
title = {Nice vertices in cubic graphs},
author = {Wuxian Chen and Fuliang Lu and Heping Zhang},
journal= {arXiv preprint arXiv:2508.21471},
year = {2025}
}
Comments
23 pages, 8 figures, published in Discrete Mathematics