On the transportation cost norm on finite metric graphs

Abstract

For a finite metric graph X=(V,E,), where V is endowed with the shortest path metric, we consider the transportation cost problem associated with the distance d on V. Namely, for f a function with total sum 0 on V, write f=Σa,b∈ VP(a,b)(δa-δb) where the transportation plan P satisfies P(a,b)≥ 0 for (a,b)∈ V× V. The cost of P is W(P):=Σa,b∈ VP(a,b)d(a,b) and the transportation norm of f is \|f\|TC=P W(P) where P runs over all transportation plans for f. In this semi-survey paper, we give short proofs for the following statements: 1)There always exists an optimal transportation plan supported in V+× V- where V+=\x∈ V: f(x)>0\ and V-=\x∈ V: f(x)<0\. If X is a metric tree, we may moreover assume that this plan involves at most |Supp(f)|-1 transports. 2) There always exists an optimal transportation plan supported in the set of edges of X. 3) Better, there always exists an optimal transportation plan supported in some spanning tree of X. We use this to reprove known formulae for the transportation norm when X is either a tree or a cycle.