On new record graphs close to bipartite Moore graphs
Abstract
The modelling of interconnection networks by graphs motivated the study of several extremal problems that involve well known parameters of a graph (degree, diameter, girth and order) and ask for the optimal value of one of them while holding the other two fixed. Here we focus in {\em bipartite Moore graphs\/}, that is, bipartite graphs attaining the optimum order, fixed either the degree/diameter or degree/girth. The fact that there are very few bipartite Moore graphs suggests the relaxation of some of the constraints implied by the bipartite Moore bound. First we deal with {\em local bipartite Moore graphs}. We find in some cases those local bipartite Moore graphs with local girths as close as possible to the local girths given by a bipartite Moore graph. Second, we construct a family of -bipartite graphs of order and diameter , for a power of prime. These graphs attain the record value for and improve the values for and .
Cite
@article{arxiv.2005.02427,
title = {On new record graphs close to bipartite Moore graphs},
author = {Gabriela Araujo-Pardo and Nacho López},
journal= {arXiv preprint arXiv:2005.02427},
year = {2020}
}