English

Coupled Graphical Models and Their Thresholds

Information Theory 2011-05-05 v1 Statistical Mechanics Discrete Mathematics math.IT

Abstract

The excellent performance of convolutional low-density parity-check codes is the result of the spatial coupling of individual underlying codes across a window of growing size, but much smaller than the length of the individual codes. Remarkably, the belief-propagation threshold of the coupled ensemble is boosted to the maximum-a-posteriori one of the individual system. We investigate the generality of this phenomenon beyond coding theory: we couple general graphical models into a one-dimensional chain of large individual systems. For the later we take the Curie-Weiss, random field Curie-Weiss, KK-satisfiability, and QQ-coloring models. We always find, based on analytical as well as numerical calculations, that the message passing thresholds of the coupled systems come very close to the static ones of the individual models. The remarkable properties of convolutional low-density parity-check codes are a manifestation of this very general phenomenon.

Keywords

Cite

@article{arxiv.1105.0785,
  title  = {Coupled Graphical Models and Their Thresholds},
  author = {S. Hamed Hassani and Nicolas Macris and Ruediger Urbanke},
  journal= {arXiv preprint arXiv:1105.0785},
  year   = {2011}
}

Comments

In proceedings of ITW 2010

R2 v1 2026-06-21T18:02:38.712Z