A randomized construction of high girth regular graphs

Abstract

We describe a new random greedy algorithm for generating regular graphs of high girth: Let k≥ 3 and c ∈ (0,1) be fixed. Let n ∈ N be even and set g = c k-1 (n). Begin with a Hamilton cycle G on n vertices. As long as the smallest degree δ (G)<k, choose, uniformly at random, two vertices u,v ∈ V(G) of degree δ(G) whose distance is at least g-1. If there are no such vertex pairs, abort. Otherwise, add the edge uv to E(G). We show that with high probability this algorithm yields a k-regular graph with girth at least g. Our analysis also implies that there are ( (n) )kn/2 labeled k-regular n-vertex graphs with girth at least g.