English

Inapproximability After Uniqueness Phase Transition in Two-Spin Systems

Computational Complexity 2015-03-20 v1

Abstract

A two-state spin system is specified by a 2 x 2 matrix A = {A_{0,0} A_{0,1}, A_{1,0} A_{1,1}} = {\beta 1, 1 \gamma} where \beta, \gamma \ge 0. Given an input graph G=(V,E), the partition function Z_A(G) of a system is defined as Z_A(G) = \sum_{\sigma: V -> {0,1}} \prod_{(u,v) \in E} A_{\sigma(u), \sigma(v)} We prove inapproximability results for the partition function in the region specified by the non-uniqueness condition from phase transition for the Gibbs measure. More specifically, assuming NP \ne RP, for any fixed \beta, \gamma in the unit square, there is no randomized polynomial-time algorithm that approximates Z_A(G) for d-regular graphs G with relative error \epsilon = 10^{-4}, if d = \Omega(\Delta(\beta,\gamma)), where \Delta(\beta,\gamma) > 1/(1-\beta\gamma) is the uniqueness threshold. Up to a constant factor, this hardness result confirms the conjecture that the uniqueness phase transition coincides with the transition from computational tractability to intractability for Z_A(G). We also show a matching inapproximability result for a region of parameters \beta, \gamma outside the unit square, and all our results generalize to partition functions with an external field.

Cite

@article{arxiv.1205.2934,
  title  = {Inapproximability After Uniqueness Phase Transition in Two-Spin Systems},
  author = {Jin-Yi Cai and Xi Chen and Heng Guo and Pinyan Lu},
  journal= {arXiv preprint arXiv:1205.2934},
  year   = {2015}
}
R2 v1 2026-06-21T21:03:13.468Z