Note on extremal problems about connected subgraph sums

Abstract

For a graph G with vertex assignment c:V(G) Z+, we define Σv∈ V(H)c(v) for H a connected subgraph of G as a connected subgraph sum of G. We study the set S(G,c) of connected subgraph sums and, in particular, resolve a problem posed by Solomon Lo in a strong form. We show that for each n-vertex graph, there is a vertex assignment c:V(G) \1,…,12n2\ such that for every n-vertex graph G' G and vertex assignment c' for G', the corresponding collections of connected subgraph sums are different (i.e., S(G,c)≠ S(G',c')). We also provide some remarks on vertex assignments of a graph G for which all connected subgraph sums are different.