Variable degeneracy on toroidal graphs

Rui Li, Tao Wang

Published 2019-07-13Version 1

Let $f$ be a nonnegative integer valued function on the vertex-set of a graph. A graph is {\bf strictly $f$-degenerate} if each nonempty subgraph $\Gamma$ has a vertex $v$ such that $\deg_{\Gamma}(v) < f(v)$. A {\bf cover} of a graph $G$ is a graph $H$ with vertex set $V(H) = \bigcup_{v \in V(G)} L_{v}$, where $L_{v} = \{\,(v, 1), (v, 2), \dots, (v, \kappa)\,\}$; the edge set $\mathscr{M} = \bigcup_{uv \in E(G)}\mathscr{M}_{uv}$, where $\mathscr{M}_{uv}$ is a matching between $L_{u}$ and $L_{v}$. A vertex set $R \subseteq V(H)$ is a {\bf transversal} of $H$ if $|R \cap L_{v}| = 1$ for each $v \in V(G)$. A transversal $R$ is a {\bf strictly $f$-degenerate transversal} if $H[R]$ is strictly $f$-degenerate. In this paper, we give some structural results on planar and toroidal graphs with forbidden configurations, and give some sufficient conditions for the existence of strictly $f$-degenerate transversal by using these structural results.