A novel algorithm for solving the Decision Boolean Satisfiability Problem without algebra
Abstract
This paper depicts an algorithm for solving the Decision Boolean Satisfiability Problem using the binary numerical properties of a Special Decision Satisfiability Problem, parallel execution, object oriented, and short termination. The two operations: expansion and simplification are used to explains why using algebra grows the resolution steps. It is proved that its complexity has an upper bound of 2n-1 where n is the number of logical variables of the given problem.
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