摘要
A graph G is (a, b)-choosable for nonnegative integers a > b if for any given family {A(v)\v ε V(G)} of sets A(v) of cardinality a there exists a family {B(v)\v ε V(G)} of subsets B(v) A(v) of cardinality b such that B(u) B(v) =θ whenever uv E(G). It is Proved in this paper that every plane graph in which no two triangles share a common vertex is (4m, m)-choosable for every nonnegative integer m.
A graph G is (a, b)-choosable for nonnegative integers a > b if for any given family {A(v)\v ε V(G)} of sets A(v) of cardinality a there exists a family {B(v)\v ε V(G)} of subsets B(v) A(v) of cardinality b such that B(u) B(v) =θ whenever uv E(G). It is Proved in this paper that every plane graph in which no two triangles share a common vertex is (4m, m)-choosable for every nonnegative integer m.
基金
This research is supported by the Postdoctoral Fund of China and the K.C.W. Education Fund of HongKong.
