Oriented diameter of graphs with diameter 4 and given edge girth

Abstract

Let f(d) be the smallest value for which every bridgeless graph G with diameter d admits a strong orientation G such that the diameter of G is at most f(d). Chvátal and Thomassen (JCT-B, 1978) obtained general bounds for f(d) and proved that f(2)=6. Kwok et al. (JCT-B, 2010) proved that 9≤ f(3)≤ 11. Wang and Chen (JCT-B, 2022) determined f(3)=9. Babu et al. (DAM, 2021) showed f(4)≤ 21. In this paper, we introduce a new approach to studying f(d) via the edge girth of a bridgeless graph G, denoted by g*(G)=\lG(e) e∈ E(G)\, where lG(e) is the length of the shortest cycle containing e in G. Then we define F(d,g*)=\diam(G) G is bridgeless,d(G)=d,g*(G)=g*\, and show f(d)=\F(d,g*) 2≤ g*≤ 2d+1\. As the main result of this paper, we establish F(4,2)=4, F(4,9)=12, F(4,3) 12, and F(4,g*) 13 for g*∈\6,7,8\, and we propose two open problems for further research.