List Packing and Correspondence Packing of Planar Graphs

Abstract

For a graph G and a list assignment L with |L(v)|=k for all v, an L-packing consists of L-colorings 1,·s,k such that i(v)j(v) for all v and all distinct i,j∈\1,…,k\. Let (G) denote the smallest k such that G has an L-packing for every L with |L(v)|=k for all v. Let Pk denote the set of all planar graphs with girth at least k. We show that (i) (G) 8 for all G∈ P3 and (ii) (G) 5 for all G∈ P4 and (iii) (G) 4 for all G∈ P5. Part (i) makes progress on a problem of Cambie, Cames van Batenburg, Davies, and Kang. We also construct outerplanar graphs G such that (G)=4, which matches the known upper bound (G) 4 for all outerplanar graphs. Finally, we consider the analogue of for correspondence coloring, c. In fact, all bounds stated above for also hold for c.