Title :
Cook is faster than Karp: a study of reducibilities in NP
Author :
Longpre, L. ; Young, Paul
Author_Institution :
Coll. of Comput. Sci., Northeastern Univ., Boston, MA, USA
Abstract :
It is unknown whether Cook reducibility of a set A to a set B (i.e. reduction of A to B by a Turing machine operating in polynomial time with free procedural calls to an algorithm for B), is more general than Karp reducibility (i.e. reduction of A to B by a function computable in polynomial time) on sets in NP. While it is conjectured that Cook reducibility is indeed a more general notion than Karp reducibility on sets in NP, proving this would imply that P is not equal to NP. More tractable subcases of the problem are investigated, proving, for example, that Cook reducibility is much faster than Karp reducibility on some classes of NP-complete sets
Keywords :
Turing machines; computational complexity; Cook reducibility; Karp reducibility; NP-complete sets; Turing machine; polynomial time; tractable subcases; Computer science; Educational institutions; Polynomials; Standards development; Turing machines;
Conference_Titel :
Structure in Complexity Theory Conference, 1988. Proceedings., Third Annual
Conference_Location :
Washington, DC
Print_ISBN :
0-8186-0866-8
DOI :
10.1109/SCT.1988.5288
