Counting hypergraph colorings in the local lemma regime
arXiv:1711.03396
Abstract
We give a fully polynomial-time approximation scheme (FPTAS) to count the number of $q$-colorings for $k$-uniform hypergraphs with maximum degree $Î$ if $k\ge 28$ and $q >357Î^{\frac{14}{k-14}}$ . We also obtain a polynomial-time almost uniform sampler if $q>931Î^{\frac{16}{k-16/3}}$. These are the first approximate counting and sampling algorithms in the regime $q\llÎ$ (for large $Î$ and $k$) without any additional assumptions. Our method is based on the recent work of Moitra (STOC, 2017). One important contribution of ours is to remove the dependency of $k$ and $Î$ in Moitra's approach.
v3: Constants Changed. Accepted to SICOMP