A Scalable Approximate Model Counter

Chakraborty, Supratik; Meel, Kuldeep S.; Vardi, Moshe Y.

doi:10.1007/978-3-642-40627-0_18

Cited by 101 publications

(170 citation statements)

References 28 publications

Supporting

Mentioning

170

Contrasting

Order By: Relevance

“…The following result about Chernoff-Hoeffding bounds, proved in [5], plays an important role in the analysis of UniGen2.…”

Section: B2 Analysis Of Generatesamplesmentioning

confidence: 99%

“…Recently, Chakraborty et al proposed a new algorithm named UniGen [5], which improves upon the ideas of UniWit. In particular, UniGen provides stronger guarantees of uniformity by exploiting a deep connection between approximate counting and almost-uniform sampling [15].…”

Section: Related Workmentioning

confidence: 99%

“…Furthermore, UniGen has been shown to scale to formulae with hundreds of thousands of variables. Even so, UniGen is typically 2-3 orders of magnitude slower than a single call to a SAT solver and therefore, its runtime performance falls short of the performance of heuristic methods commonly employed in industry to generate stimuli for CRV 5 . In this paper, we offer several improvements to UniGen and obtain an algorithm with substantially improved performance that can be further scaled by parallelization to match the requirements of industry.…”

Section: Related Workmentioning

confidence: 99%

“…This is done along the same lines as in UniGen, which used an approximate model counter such as ApproxMC [5]. The procedure invokes a SAT solver through the function BSAT(φ, m, S).…”

Section: Algorithm 1 Estimateparameters(f S ε)mentioning

confidence: 99%

“…In such scenarios, beginning with i = hashBits−1 in subsequent iterations saves considerable time. This heuristic is similar in spirit to "leapfrogging" in ApproxMC [5] and UniWit [4], but does not compromise the theoretical guarantees of UniGen2 in any way.…”

Section: Algorithm 1 Estimateparameters(f S ε)mentioning

confidence: 99%

See 4 more Smart Citations

On Parallel Scalable Uniform SAT Witness Generation

Chakraborty

Fremont

Meel

et al. 2015

Tools and Algorithms for the Construction and Analysis of Systems

Self Cite

View full text Add to dashboard Cite

Abstract. Constrained-random verification (CRV) is widely used in industry for validating hardware designs. The effectiveness of CRV depends on the uniformity of test stimuli generated from a given set of constraints. Most existing techniques sacrifice either uniformity or scalability when generating stimuli. While recent work based on random hash functions has shown that it is possible to generate almost uniform stimuli from constraints with 100,000+ variables, the performance still falls short of today's industrial requirements. In this paper, we focus on pushing the performance frontier of uniform stimulus generation further. We present a random hashing-based, easily parallelizable algorithm, UniGen2, for sampling solutions of propositional constraints. UniGen2 provides strong and relevant theoretical guarantees in the context of CRV, while also offering significantly improved performance compared to existing almostuniform generators. Experiments on a diverse set of benchmarks show that UniGen2 achieves an average speedup of about 20× over a state-ofthe-art sampling algorithm, even when running on a single core. Moreover, experiments with multiple cores show that UniGen2 achieves a nearlinear speedup in the number of cores, thereby boosting performance even further.

show abstract

“…The following result about Chernoff-Hoeffding bounds, proved in [5], plays an important role in the analysis of UniGen2.…”

Section: B2 Analysis Of Generatesamplesmentioning

confidence: 99%

Section: Related Workmentioning

confidence: 99%

Section: Related Workmentioning

confidence: 99%

“…This is done along the same lines as in UniGen, which used an approximate model counter such as ApproxMC [5]. The procedure invokes a SAT solver through the function BSAT(φ, m, S).…”

Section: Algorithm 1 Estimateparameters(f S ε)mentioning

confidence: 99%

Section: Algorithm 1 Estimateparameters(f S ε)mentioning

confidence: 99%

See 3 more Smart Citations

On Parallel Scalable Uniform SAT Witness Generation

Chakraborty

Fremont

Meel

et al. 2015

Tools and Algorithms for the Construction and Analysis of Systems

Self Cite

View full text Add to dashboard Cite

show abstract

The Return of xorro

Everardo

Janhunen

Kaminski

et al. 2019

Logic Programming and Nonmonotonic Reasoning

View full text Add to dashboard Cite

Although parity constraints are at the heart of many relevant reasoning modes like sampling or model counting, little attention has so far been paid to their integration into ASP systems. We address this shortcoming and investigate a variety of alternative approaches to implementing parity constraints, ranging from rather basic ASP encodings to more sophisticated theory propagators (featuring Gauss-Jordan elimination). All of them are implemented in the xorro system by building on the theory reasoning capabilities of the ASP system clingo. Our comparative empirical study investigates the impact of the number and size of parity constraints on performance and indicates the merits of the respective implementation techniques. Finally, we benefit from parity constraints to equip xorro with means to sample answer sets, paving the way for new applications of ASP.

show abstract

Dual Hashing-Based Algorithms for Discrete Integration

Colnet

Meel

2019

Lecture Notes in Computer Science

View full text Add to dashboard Cite

A Scalable Approximate Model Counter

Cited by 101 publications

References 28 publications

On Parallel Scalable Uniform SAT Witness Generation

On Parallel Scalable Uniform SAT Witness Generation

The Return of xorro

Dual Hashing-Based Algorithms for Discrete Integration

Contact Info

Product

Resources

About