Paper Info
Title
Reweighted Belief Propagation and Quiet Planting for Random K-SAT.
Abstract
We study the random K-satisfiability problem using a partition function where each solution is reweighted according to the number of variables that satisfy every clause. We apply belief propagation and the related cavity method to the reweighted partition function. This allows us to obtain several new results on the properties of random K-satisfiability problem. In particular the reweighting allows to introduce a planted ensemble that generates instances that are, in some region of parameters, equivalent to random instances. We are hence able to generate at the same time a typical random SAT instance and one of its solutions. We study the relation between clustering and belief propagation fixed points and we give a direct evidence for the existence of purely entropic (rather than energetic) barriers between clusters in some region of parameters in the random K-satisfiability problem. We exhibit, in some large planted instances, solutions with a non-trivial whitening core; such solutions were known to exist but were so far never found on very large instances. Finally, we discuss algorithmic hardness of such planted instances and we determine a region of parameters in which planting leads to satisfiable benchmarks that, up to our knowledge, are the hardest known.
Year
Venue
Field
2014
JSAT
QUIET,Discrete mathematics,Cluster (physics),Partition function (statistical mechanics),Cavity method,Algorithm,Fixed point,Cluster analysis,Partition (number theory),Mathematics,Belief propagation
DocType
Volume
Issue
Journal
8
3/4
ISSN
Citations 
PageRank 
Journal on Satisfiability, Boolean Modeling and Computation 8 (2014) 149-171
7
0.98
References 
Authors
27
3
Name
Order
Citations
PageRank
Florent Krzakala197767.30
Marc Mézard259039.09
Lenka Zdeborová3119078.62