English

Phase Transition for Glauber Dynamics for Independent Sets on Regular Trees

Probability 2010-07-15 v1 Discrete Mathematics

Abstract

We study the effect of boundary conditions on the relaxation time of the Glauber dynamics for the hard-core model on the tree. The hard-core model is defined on the set of independent sets weighted by a parameter λ\lambda, called the activity. The Glauber dynamics is the Markov chain that updates a randomly chosen vertex in each step. On the infinite tree with branching factor bb, the hard-core model can be equivalently defined as a broadcasting process with a parameter ω\omega which is the positive solution to λ=ω(1+ω)b\lambda=\omega(1+\omega)^b, and vertices are occupied with probability ω/(1+ω)\omega/(1+\omega) when their parent is unoccupied. This broadcasting process undergoes a phase transition between the so-called reconstruction and non-reconstruction regions at ωrlnb/b\omega_r\approx \ln{b}/b. Reconstruction has been of considerable interest recently since it appears to be intimately connected to the efficiency of local algorithms on locally tree-like graphs, such as sparse random graphs. In this paper we show that the relaxation time of the Glauber dynamics on regular bb-ary trees ThT_h of height hh and nn vertices, undergoes a phase transition around the reconstruction threshold. In particular, we construct a boundary condition for which the relaxation time slows down at the reconstruction threshold. More precisely, for any ωlnb/b\omega \le \ln{b}/b, for ThT_h with any boundary condition, the relaxation time is Ω(n)\Omega(n) and O(n1+ob(1))O(n^{1+o_b(1)}). In contrast, above the reconstruction threshold we show that for every δ>0\delta>0, for ω=(1+δ)lnb/b\omega=(1+\delta)\ln{b}/b, the relaxation time on ThT_h with any boundary condition is O(n1+δ+ob(1))O(n^{1+\delta + o_b(1)}), and we construct a boundary condition where the relaxation time is Ω(n1+δ/2ob(1))\Omega(n^{1+\delta/2 - o_b(1)}).

Keywords

Cite

@article{arxiv.1007.2255,
  title  = {Phase Transition for Glauber Dynamics for Independent Sets on Regular Trees},
  author = {Ricardo Restrepo and Daniel Stefankovic and Juan C. Vera and Eric Vigoda and Linji Yang},
  journal= {arXiv preprint arXiv:1007.2255},
  year   = {2010}
}
R2 v1 2026-06-21T15:47:51.545Z