Proof of a conjecture on monomial graphs
Abstract
Let be a positive integer, be an odd prime, , and be the finite field of elements. Let . The graph is a bipartite graph with vertex partitions and , and edges defined as follows: a vertex is adjacent to a vertex if and only if and . Motivated by some questions in finite geometry and extremal graph theory, Dmytrenko, Lazebnik and Williford conjectured in 2007 that if and are both monomials and has no cycle of length less than eight, then is isomorphic to the graph . They proved several instances of the conjecture by reducing it to the property of polynomials and being permutation polynomials of . In this paper we prove the conjecture by obtaining new results on the polynomials and , which are also of interest on their own.
Cite
@article{arxiv.1507.05306,
title = {Proof of a conjecture on monomial graphs},
author = {Xiang-dong Hou and Stephen D. Lappano and Felix Lazebnik},
journal= {arXiv preprint arXiv:1507.05306},
year = {2015}
}
Comments
22 pages