Taking it to the limit: on infinite variants of NP-complete problems

Author

Hirst, Tirza ; Hare, David

Author_Institution

Dept. of Appl. Math. & Comput. Sci., Weizmann Inst. of Sci., Rehovot, Israel

fYear

1993

fDate

18-21 May 1993

Firstpage

292

Lastpage

304

Abstract

Infinite, recursive versions of NP optimization problems are defined. For example, MAX CLIQUE becomes the question of whether a recursive graph contains an infinite clique. The work was motivated by trying to understand what makes some NP problems highly undecidable in the infinite case, while others remain on low levels of the arithmetical hierarchy. Two results are proved; one enables using knowledge about the infinite case to yield implications to the finite case, and the other enables implications in the other direction. Taken together, the two results provide a method for proving (finitary) problems to be outside the syntactic class MAX NP, hence outside MAX SNP too. The technique is illustrated with many examples

Keywords

computability; computational complexity; decidability; graph theory; recursive functions; MAX CLIQUE; MAX NP; MAX SNP; NP optimization problems; NP-complete problems; decidability; infinite clique; infinite variants; recursive graph; recursive versions; syntactic class; Computer science; Mathematics; NP-complete problem; Polynomials; Turing machines;

fLanguage

English

Publisher

ieee

Conference_Titel

Structure in Complexity Theory Conference, 1993., Proceedings of the Eighth Annual

Conference_Location

San Diego, CA

Print_ISBN

0-8186-4070-7

Type

conf

DOI

10.1109/SCT.1993.336518

Filename

336518