Asymptotics for Palette Sparsification from Variable Lists

Abstract

It is shown that the following holds for each >0. For G an n-vertex graph of maximum degree D, lists Sv of size D+1 (for v∈ V(G)), and Lv chosen uniformly from the ((1+) n)-subsets of Sv (independent of other choices), \[ G admits a proper coloring σ with σv∈ Lv ∀ v \] with probability tending to 1 as D ∞. When each Sv is \1… D+1\, this is an asymptotically optimal version of the ``palette sparsification'' theorem of Assadi, Chen and Khanna that was proved in an earlier paper by the present authors.

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