Tighter Bounds on the Degree-Truncated Choice Number of Planar Graphs

Abstract

Assume G is a graph and k is a positive integer. Let f:V(G) N be defined as f(v)=\k,dG(v)\. If G is f-choosable, then we say G is degree-truncated k-choosable. The degree-truncated choice number of G is chd(G) = \k: G is degree-truncated k-choosable\. For a family G of graphs, chd(G) = \chd(G):G ∈ G\. Let P denote the family of 3-connected non-complete planar graphs. Richter asked in 2008 whether chd(P) 6. In 2025, Zhou, Zhu and Zhu answered this question in negative and proved that 8 chd(P) 16. This result was improved by Jiang, Xu, Xu, and Zhu, who proved that 9 chd(P) 12. In this paper, we further improve the result and prove that 10 chd(P) 11. We conjecture that chd(P) =10, and we confirm this conjecture for those planar graphs G ∈ P for which the subgraph induced by vertices of degree at least 11 is 4-choosable.