Weak degeneracy of planar graphs and locally planar graphs

Abstract

Weak degeneracy is a variation of degeneracy which shares many nice properties of degeneracy. In particular, if a graph G is weakly d-degenerate, then for any (d + 1)-list assignment L of G, one can construct an L-coloring of G by a modified greedy coloring algorithm. It is known that planar graphs of girth 5 are 3-choosable and locally planar graphs are 5-choosable. This paper strengthens these results and proves that planar graphs of girth 5 are weakly 2-degenerate and locally planar graphs are weakly 4-degenerate.