Every nice graph is (1,5)-choosable

Abstract

A graph G=(V,E) is total weight (k,k')-choosable if the following holds: For any list assignment L which assigns to each vertex v a set L(v) of k real numbers, and assigns to each edge e a set L(e) of k' real numbers, there is a proper L-total weighting, i.e., a map φ: V E R such that φ(z) ∈ L(z) for z ∈ V E, and Σe ∈ E(u)φ(e)+φ(u) Σe ∈ E(v)φ(e)+φ(v) for every edge \u,v\. A graph is called nice if it contains no isolated edges. As a strengthening of the famous 1-2-3 conjecture, it was conjectured in [T. Wong and X. Zhu, Total weigt choosability of graphs, J. Graph Th. 66 (2011),198-212] that every nice graph is total weight (1,3)-choosable. The problem whether there is a constant k such that every nice graph is total weight (1,k)-choosable remained open for a decade and was recently solved by Cao [L. Cao, Total weight choosability of graphs: Towards the 1-2-3 conjecture, J. Combin. Th. B, 149(2021), 109-146], who proved that every nice graph is total weight (1, 17)-choosable. This paper improves this result and proves that every nice graph is total weight (1, 5)-choosable.