Abstract: The list coloring problem of the signed graphs is investigated in this paper, which proves that the choosability of every signed graph without [K5]-minor or [K3,3]-minor is at most 5, and this upper bound cannot be lowered anymore. This generalizes a corresponding result of Jin, Kang and Steffen on signed planar graph, which is published in “European Journal of Combinatorics, 2016, 52：234-243”.

Key words: graph theory, signed graph, list vertex coloring, choosability, minor

摘要： 针对符号图的列表点染色问题，证明了任何不含[K5]-子式或[K3,3]-子式的符号图的选择数至多为5，并且此处的上界5是不可再降低的，从而推广了Jin、Kang与Steffen发表于“European Journal of Combinatorics，2016，52：234-243”的关于符号平面图的对应结论。

关键词: 图论, 符号图, 列表点染色, 选择数, 子式