Some results on total weight choosability

Abstract

A graph G=(V,E) is called (k,k')-choosable if for any total list assignment L which assigns to each vertex v a set L(v) of k real numbers, and assigns to each edge e a set L(e) of k' real numbers, there is a mapping f:V E→ R such that f(y)∈ L(y) for any y∈ V E and for any two adjacent vertices v, v', Σe∈ E(v)f(e)+f(v)≠ Σe∈ E(v')f(e)+f(v'), where E(x) denotes the set of incident edges of a vertex x∈ V(G). In this paper, we characterize a sufficient condition on (1,2)-choosable of graphs. We show that every connected (n,m)-graph is both (2,2)-choosable and (1,3)-choosable if m=n or n+1, where (n,m)-graph denotes the graph with n vertices and m edges. Furthermore, we prove that some graphs obtained by some graph operations are (2,2)-choosable.