Satisfiability Threshold for Random Regular nae-sat

Author(s)

Ding, Jian; Sly, Allan; Sun, Nike

Abstract

We consider the random regular k-nae- sat problem with n variables, each appearing in exactly d clauses. For all k exceeding an absolute constant k[subscript 0] , we establish explicitly the satisfiability threshold d⋆≡d⋆(k). We prove that for d<d⋆ the problem is satisfiable with high probability, while for d>d⋆ the problem is unsatisfiable with high probability. If the threshold d⋆ lands exactly on an integer, we show that the problem is satisfiable with probability bounded away from both zero and one. This is the first result to locate the exact satisfiability threshold in a random constraint satisfaction problem exhibiting the condensation phenomenon identified by Krz̧akała et al. [Proc Natl Acad Sci 104(25):10318–10323, 2007]. Our proof verifies the one-step replica symmetry breaking formalism for this model. We expect our methods to be applicable to a broad range of random constraint satisfaction problems and combinatorial problems on random graphs.

Date issued

2015-11

URI

http://hdl.handle.net/1721.1/109568

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Communications in Mathematical Physics

Publisher

Springer-Verlag

Citation

Ding, Jian, Allan Sly, and Nike Sun. “Satisfiability Threshold for Random Regular Nae-Sat.” Communications in Mathematical Physics 341, no. 2 (November 26, 2015): 435–489. © 2015 Springer-Verlag

Version: Author's final manuscript

ISSN

0010-3616

1432-0916