Title :
Maximum Renamable Horn and Maximum Independent Sets
Author :
Qin, Yongbin ; Xu, Daoyun
Author_Institution :
Dept. of Comput. Sci., Guizhou Univ., Guiyang, China
fDate :
March 31 2009-April 2 2009
Abstract :
A clause set is renamable Horn if the result replacing part propositional variable with its complement is a set of Horn clauses. The renamable Horn problem is solvable in linear time, but the maximum renamable Horn problem (MAX-RHS) is NP-hard. In this paper, we present transformations between clause sets and undirected graphs in polynomial time, such that finding a renamable Horn subset of a clause set is equivalent to finding an independent set of vertices of a graph. Then, the problems MAX-RHS and MAX-IND have the same complexity, and MAX-RHS is inapproximable.
Keywords :
Horn clauses; computability; computational complexity; graph theory; set theory; Horn clause set; Horn satisfiability; NP-hard problem; maximum independent set; maximum renamable horn; part propositional variable; polynomial time; undirected graph; Computer science; Logic; Polynomials; NP-Hardness; inapproximability; maximum independent set; maximum renamable Horn set; polynomial transformation;
Conference_Titel :
Computer Science and Information Engineering, 2009 WRI World Congress on
Conference_Location :
Los Angeles, CA
Print_ISBN :
978-0-7695-3507-4
DOI :
10.1109/CSIE.2009.690
