A Folding Strategy for SAT solvers based on Shannon´s expansion theorem

Author

Saibua, Siwat ; Kuo, Po-Yu ; Zhou, Dian ; Jing, Ming-e

Author_Institution

Dept. of Electr. Eng., Univ. of Texas at Dallas, Richardson, TX, USA

fYear

2010

fDate

27-29 Sept. 2010

Firstpage

177

Lastpage

181

Abstract

SAT problem has been an active research subject and many impressive SAT solvers have been proposed. Most of algorithms used in modern SAT solvers are based on tree structured searching strategy, combining with heuristic approaches to reduce the search space. In contrast to most existing solvers, we treat SAT problem as a logical optimization issue which can be solved by a logic minimizer. In this paper, we propose a Folding Strategy (FS) based on the Shannon´s expansion theorem such that in every step, one variable is deducted and the size of search space is shrunk. The new method will find the solution after Karnaugh Map (K-Map) is folded no more than n (number of variables) times because search space is decreased by half in each folding step.

Keywords

Boolean functions; computability; information theory; optimisation; search problems; tree data structures; Boolean function; K-map; Karnaugh map; SAT problem; SAT solver; Shannon expansion theorem; folding strategy; logic minimizer; logical optimization; search space; tree structured searching; Algorithm design and analysis; Boolean functions; Equations; Heuristic algorithms; Minimization; Robustness; Runtime;

fLanguage

English

Publisher

ieee

Conference_Titel

SOC Conference (SOCC), 2010 IEEE International

Conference_Location

Las Vegas, NV

ISSN

Pending

Print_ISBN

978-1-4244-6682-5

Type

conf

DOI

10.1109/SOCC.2010.5784748

Filename

5784748