Inversion diameter and treewidth

Abstract

In an oriented graph G, the inversion of a subset X of vertices is the operation that reverses the orientation of all arcs with both end-vertices in X. The inversion graph of a graph G, denoted by I(G), is the graph whose vertices are orientations of G in which two orientations G1 and G2 are adjacent if and only if there is an inversion transforming G1 into G2.The inversion diameter of a graph G is the diameter of its inversion graph I(G), denoted by diam(I(G)).Havet, Hörsch, and Rambaud~(2024) first proved that for G of treewidth k, diam(I(G)) 2k, and that there are graphs of treewidth k with inversion diameter k+2.In this paper, we construct graphs of treewidth k with inversion diameter 2k, which implies that the previous upper bound diam(I(G)) 2k is tight.Moreover, for graphs with maximum degree Δ, Havet, Hörsch, and Rambaud~(2024) proved diam(I(G)) 2Δ-1 and conjectured that diam(I(G)) Δ. We prove the conjecture when Δ=3 with the help of computer calculations.