On the weights of simple paths in weighted complete graphs

Abstract

Consider a weighted graph G with n vertices, numbered by the set 1,...,n. For any path p in G, we call wG(p) the sum of the weights of the edges of the path and we define the multiset Di,j (G) = wG(p) | p simple path between i and j We establish a criterion to say when, given a multisubset of the set of the real numbers there exists a weighted complete graph G such that the multisubset is equal to Di,j (G) for some i,j vertices of G. Besides we establish a criterion to say when, given for any i, j in 1,...,n a multisubset of the set of the real numbers, Di,j, there exists a weighted complete graph G with vertices 1,...,n such that Di,j (G)= Di,j for any i,j.