English

Rapid Mixing at the Uniqueness Threshold

Data Structures and Algorithms 2026-01-08 v3 Probability

Abstract

Over the past decades, a fascinating computational phase transition has been identified in sampling from Gibbs distributions. Though, the computational complexity at the critical point remains poorly understood, as previous algorithmic and hardness results all required a constant slack from this threshold. In this paper, we resolve this open question at the critical phase transition threshold, thus completing the picture of the computational phase transition. We show that for the hardcore model on graphs with maximum degree Δ3\Delta\ge 3 at the uniqueness threshold λ=λc(Δ)\lambda = \lambda_c(\Delta), the mixing time of Glauber dynamics is upper bounded by a polynomial in nn, but is not nearly linear in the worst case. For the Ising model (either antiferromagnetic or ferromagnetic), we establish similar results. For the Ising model on graphs with maximum degree Δ3\Delta\ge 3 at the critical temperature β\beta where β=βc(Δ)|\beta| = \beta_c(\Delta), with the tree-uniqueness threshold βc(Δ)\beta_c(\Delta), we show that the mixing time of Glauber dynamics is upper bounded by O~(n3+O(1/Δ))\tilde{O}\left(n^{3 + O(1/\Delta)}\right) and lower bounded by Ω(n3/2)\Omega\left(n^{3/2}\right) in the worst case. For the Ising model specified by a critical interaction matrix JJ with J2=1\left \lVert J \right \rVert_2=1, we obtain an upper bound O~(n3/2)\tilde{O}(n^{3/2}) for the mixing time, matching the lower bound Ω(n3/2)\Omega\left(n^{3/2}\right) on the complete graph up to a logarithmic factor. Our mixing time upper bounds are derived from a new interpretation and analysis of the localization scheme method introduced by Chen and Eldan (2022), applied to the field dynamics for the hardcore model and the proximal sampler for the Ising model. As key steps in both our upper and lower bounds, we establish sub-linear upper and lower bounds for spectral independence at the critical point for worst-case instances.

Keywords

Cite

@article{arxiv.2411.03413,
  title  = {Rapid Mixing at the Uniqueness Threshold},
  author = {Xiaoyu Chen and Zongchen Chen and Yitong Yin and Xinyuan Zhang},
  journal= {arXiv preprint arXiv:2411.03413},
  year   = {2026}
}

Comments

Remove the incorrectly claimed square-root spectral independence result for the critical graphical Ising model; see Remark 1.6 for details

R2 v1 2026-06-28T19:49:24.848Z