Title :
Uniformly hard languages
Author :
Downey, Rod ; Fortnow, Lance
Author_Institution :
Dept. of Math., Victoria Univ., Wellington, New Zealand
Abstract :
Ladner (1975) showed that there are no minimal recursive sets under polynomial-time reductions. Given any recursive set A, Ladner constructs a set B such that B strictly reduces to A but B does not lie in P. The set B does have very long sequences of input lengths of easily computable instances. We examine whether Ladner´s results hold if we restrict ourselves to “uniformly hard languages” which have no long sequences of easily computable instances. Under a hard to disprove assumption, we show that there exists a minimal recursive uniformly hard set under honest many-one polynomial-time reductions
Keywords :
computational complexity; formal languages; recursive functions; polynomial-time reductions; recursive set; uniformly hard languages; uniformly hard set; Computer science; Contracts; Mathematics; Polynomials; World Wide Web;
Conference_Titel :
Computational Complexity, 1998. Proceedings. Thirteenth Annual IEEE Conference on
Conference_Location :
Buffalo, NY
Print_ISBN :
0-8186-8395-3
DOI :
10.1109/CCC.1998.694610
