Near-Uniform Sampling of Combinatorial Spaces Using XOR Constraints

Carla P. Gomes; Ashish Sabharwal; Bart Selman

2006 NIPS NeurIPS 2006

Near-Uniform Sampling of Combinatorial Spaces Using XOR Constraints

Abstract

We propose a new technique for sampling the solutions of combinatorial problems in a near-uniform manner. We focus on problems specified as a Boolean formula, i.e., on SAT instances. Sampling for SAT problems has been shown to have interesting connections with probabilistic reasoning, making practical sampling algorithms for SAT highly desirable. The best current approaches are based on Markov Chain Monte Carlo methods, which have some practical limitations. Our approach exploits combinatorial properties of random parity (X O R) constraints to prune away solutions near-uniformly. The final sample is identified amongst the remaining ones using a state-of-the-art SAT solver. The resulting sampling distribution is provably arbitrarily close to uniform. Our experiments show that our technique achieves a significantly better sampling quality than the best alternative.

🚀 Conference Pioneer — NIPS 2006

🌱 Topic Pioneer — Algorithms

🌉 Interdisciplinary Bridge — Computer Science and Mathematics & Optimization

📈 Trend Setter — Combinatorial Optimization

🧭 Keyword Pioneer — combinatorial optimization

🐣 Hot Topic Early Bird — combinatorial optimization

🐝 Cross-Pollinator — Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning

Authors

Carla P. Gomes , Ashish Sabharwal , Bart Selman

Topics

Mathematics & Optimization > Optimization > Combinatorial Optimization Mathematics & Optimization > Optimization > Stochastic Methods Computer Science > Foundations > Algorithms Mathematics & Optimization > Optimization > Discrete Optimization Mathematics & Optimization > Probability > Stochastic Processes Machine Learning > Core Methods > Sampling Machine Learning > Learning Types > Sampling

Keywords

combinatorial optimization boolean satisfiability markov chain monte carlo combinatorial sampling uniform sampling near-uniform sampling satisfiability solving sat solver sampling algorithm xor constraint

Download PDF

Related papers

Temporal Coding using the Response Properties of Spiking Neurons 2006

Parameter Expanded Variational Bayesian Methods 2006

Effects of Stress and Genotype on Meta-parameter Dynamics in Reinforcement Learning 2006

Ordinal Regression by Extended Binary Classification 2006

Blind source separation for over-determined delayed mixtures 2006