Decreasing the mean subtree order by adding k edges

Abstract

The mean subtree order of a given graph G, denoted μ(G), is the average number of vertices in a subtree of G. Let G be a connected graph. Chin, Gordon, MacPhee, and Vincent [J. Graph Theory, 89(4): 413-438, 2018] conjectured that if H is a proper spanning supergraph of G, then μ(H) > μ(G). Cameron and Mol [J. Graph Theory, 96(3): 403-413, 2021] disproved this conjecture by showing that there are infinitely many pairs of graphs H and G with H⊃ G, V(H)=V(G) and |E(H)|= |E(G)|+1 such that μ(H) < μ(G). They also conjectured that for every positive integer k, there exists a pair of graphs G and H with H⊃ G, V(H)=V(G) and |E(H)| = |E(G)| +k such that μ(H) < μ(G). Furthermore, they proposed that μ(Km+nK1) < μ(Km, n) provided n m. In this note, we confirm these two conjectures.