TY - JOUR
T1 - The replica symmetric phase of random constraint satisfaction problems
AU - Coja-Oghlan, Amin
AU - Kapetanopoulos, Tobias
AU - Müller, Noela
PY - 2020/5
Y1 - 2020/5
N2 - Random constraint satisfaction problems play an important role in computer science and combinatorics. For example, they provide challenging benchmark examples for algorithms, and they have been harnessed in probabilistic constructions of combinatorial structures with peculiar features. In an important contribution (Krzakala et al. 2007, Proc. Nat. Acad. Sci.), physicists made several predictions on the precise location and nature of phase transitions in random constraint satisfaction problems. Specifically, they predicted that their satisfiability thresholds are quite generally preceded by several other thresholds that have a substantial impact both combinatorially and computationally. These include the condensation phase transition, where long-range correlations between variables emerge, and the reconstruction threshold. In this paper we prove these physics predictions for a broad class of random constraint satisfaction problems. Additionally, we obtain contiguity results that have implications for Bayesian inference tasks, a subject that has received a great deal of interest recently (e.g. Banks et al. 2016, Proc. 29th COLT).
AB - Random constraint satisfaction problems play an important role in computer science and combinatorics. For example, they provide challenging benchmark examples for algorithms, and they have been harnessed in probabilistic constructions of combinatorial structures with peculiar features. In an important contribution (Krzakala et al. 2007, Proc. Nat. Acad. Sci.), physicists made several predictions on the precise location and nature of phase transitions in random constraint satisfaction problems. Specifically, they predicted that their satisfiability thresholds are quite generally preceded by several other thresholds that have a substantial impact both combinatorially and computationally. These include the condensation phase transition, where long-range correlations between variables emerge, and the reconstruction threshold. In this paper we prove these physics predictions for a broad class of random constraint satisfaction problems. Additionally, we obtain contiguity results that have implications for Bayesian inference tasks, a subject that has received a great deal of interest recently (e.g. Banks et al. 2016, Proc. 29th COLT).
KW - 05C80
KW - 2010 MSC Codes:
KW - 68Q87
KW - 82B20
KW - 82B26
UR - http://www.scopus.com/inward/record.url?scp=85076342632&partnerID=8YFLogxK
U2 - 10.1017/S0963548319000440
DO - 10.1017/S0963548319000440
M3 - Article
SN - 0963-5483
VL - 29
SP - 346
EP - 422
JO - Combinatorics, Probability and Computing
JF - Combinatorics, Probability and Computing
IS - 3
ER -