A formula for the number of the spanning trees of line graphs

Abstract

Let G=(V,E) be a loopless graph and T(G) be the set of all spanning trees of G. Let L(G) be the line graph of the graph G and t(L(G)) be the number of spanning trees of L(G). Then, by using techniques from electrical networks, we obtain the following formula: t(L(G)) = 1Πv∈ Vd2(v)ΣT⊂eq T(G)[Πe = xy∈ Td(x)d(y)][Πe = uv∈ E T[d(u)+d(v)]]. As a result, we provide a very simple and different proof of the formula on the number of spanning trees of some irregular line graphs, and give a positive answer to a conjecture proposed by Yan [J. Combin. Theory Ser. A 120 (2013) no. 7, 1642-1648]. By applying our formula we also derive the number of spanning trees of circulant line graphs.