Constrained Sampling and Counting: Universal Hashing Meets SAT Solving

December 21, 2015 Β· Declared Dead Β· πŸ› AAAI Workshop: Beyond NP

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Authors Kuldeep S. Meel, Moshe Vardi, Supratik Chakraborty, Daniel J. Fremont, Sanjit A. Seshia, Dror Fried, Alexander Ivrii, Sharad Malik arXiv ID 1512.06633 Category cs.AI: Artificial Intelligence Cross-listed cs.LO Citations 78 Venue AAAI Workshop: Beyond NP Last Checked 2 months ago
Abstract
Constrained sampling and counting are two fundamental problems in artificial intelligence with a diverse range of applications, spanning probabilistic reasoning and planning to constrained-random verification. While the theory of these problems was thoroughly investigated in the 1980s, prior work either did not scale to industrial size instances or gave up correctness guarantees to achieve scalability. Recently, we proposed a novel approach that combines universal hashing and SAT solving and scales to formulas with hundreds of thousands of variables without giving up correctness guarantees. This paper provides an overview of the key ingredients of the approach and discusses challenges that need to be overcome to handle larger real-world instances.
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