Palette Sparsification via FKNP
Abstract
A random set S is p-spread if, for all sets T, P(S ⊃eq T) ≤ p|T|. There is a constant C>1 large enough that for every graph G with maximum degree D, there is a C/D-spread distribution on (D+1)-colorings of G. Making use of a connection between thresholds and spread distributions due to Frankston, Kahn, Narayanan, and Park, a palette sparsification theorem of Assadi, Chen, and Khanna follows.
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