Improved lower bounds on the maximum size of graphs with girth 5

Abstract

We present a new algorithm for improving lower bounds on ex(n;\C3,C4\), the maximum size (number of edges) of an n-vertex graph of girth at least 5. The core of our algorithm is a variant of a hill-climbing heuristic introduced by Exoo, McKay, Myrvold and Nadon (2011) to find small cages. Our algorithm considers a range of values of n in multiple passes. In each pass, the hill-climbing heuristic for a specific value of n is initialized with a few graphs obtained by modifying near-extremal graphs previously found for neighboring values of n, allowing to `propagate' good patterns that were found. Focusing on the range n∈ \74,75, …, 198\, which is currently beyond the scope of exact methods, our approach yields improvements on existing lower bounds for ex(n;\C3,C4\) for all n in the range, except for two values of n (n=96,97).