Survey-propagation decimation through distributed local computations
Abstract
We discuss the implementation of two distributed solvers of the random K-SAT problem, based on some development of the recently introduced survey-propagation (SP) algorithm. The first solver, called the "SP diffusion algorithm", diffuses as dynamical information the maximum bias over the system, so that variable nodes can decide to freeze in a self-organized way, each variable making its decision on the basis of purely local information. The second solver, called the "SP reinforcement algorithm", makes use of time-dependent external forcing messages on each variable, which let the variables get completely polarized in the direction of a solution at the end of a single convergence. Both methods allow us to find a solution of the random 3-SAT problem in a range of parameters comparable with the best previously described serialized solvers. The simulated time of convergence towards a solution (if these solvers were implemented on a distributed device) grows as log(N).
Keywords
Cite
@article{arxiv.cond-mat/0512002,
title = {Survey-propagation decimation through distributed local computations},
author = {Joel Chavas and Cyril Furtlehner and Marc Mezard and Riccardo Zecchina},
journal= {arXiv preprint arXiv:cond-mat/0512002},
year = {2009}
}
Comments
18 pages, 10 figures