Optimal Mixing Time for the Ising Model in the Uniqueness Regime
Abstract
We prove an optimal O(n n) mixing time of the Glauber dynamics for the Ising models with edge activity β ∈ (-2, -2). This mixing time bound holds even if the maximum degree is unbounded. We refine the boosting technique developed in [CFYZ21], and prove a new boosting theorem by utilizing the entropic independence defined in [AJK+21]. The theorem relates the modified log-Sobolev (MLS) constant of the Glauber dynamics for a near-critical Ising model to that for an Ising model in a sub-critical regime.
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