Generalized Petersen graphs are (1,3)-choosable

Abstract

A total weighting of a graph G is a mapping φ that assigns a weight to each vertex and each edge of G. The vertex-sum of v ∈ V(G) with respect to φ is Sφ(v)=Σe∈ E(v)φ(e)+φ(v). A total weighting is proper if adjacent vertices have distinct vertex-sums. A graph G=(V,E) is called (k,k')-choosable if the following is true: If each vertex x is assigned a set L(x) of k real numbers, and each edge e is assigned a set L(e) of k' real numbers, then there is a proper total weighting φ with φ(y)∈ L(y) for any y ∈ V E. In this paper, we prove that the generalized Petersen graphs are (1,3)-choosable.