Rapid Mixing of Hypergraph Independent Set
Abstract
We prove that the the mixing time of the Glauber dynamics for sampling independent sets on n-vertex k-uniform hypergraphs is O(n n) when the maximum degree satisfies ≤ c 2k/2, improving on the previous bound [BDK06] of ≤ k-2. This result brings the algorithmic bound to within a constant factor of the hardness bound of [BGG+16] which showed that it is NP-hard to approximately count independent sets on hypergraphs when ≥ 5 · 2k/2.
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