论文信息 - Some Observations on NP, Real Numbers and P-Selective Sets

Some Observations on NP, Real Numbers and P-Selective Sets

Abstract We show that each standard left cut of a real number is a p -selective set. Classification results about NP real numbers and recursively enumerable real numbers follow from similar results about p -selective and semirecursive sets. In particular, it is proved that no left cut can be NP -hard unless the polynomial hierarchy collapses to ϵ 2 P . This result is surprising because it shows that the McLaughlin-Martin construction of a ⩽ tt -complete r.e. semirecursive set fails at the polynomial time complexity level.

Alan L. Selman

[1] Ker-I Ko,et al. Computational Complexity of Real Functions , 1982, Theor. Comput. Sci..

[2] R.E. Ladner,et al. A Comparison of Polynomial Time Reducibilities , 1975, Theor. Comput. Sci..

[3] Alan L. Selman,et al. Reductions on NP and P-Selective Sets , 1982, Theor. Comput. Sci..

[4] Ker-I Ko. The Maximum Value Problem and NP Real Numbers , 1982, J. Comput. Syst. Sci..

[5] Ronald V. Book,et al. Tally Languages and Complexity Classes , 1974, Inf. Control..

[6] C. Jockusch. Semirecursive sets and positive reducibility , 1968 .

[7] Richard J. Lipton,et al. Some connections between nonuniform and uniform complexity classes , 1980, STOC '80.

[8] Emil L. Post. Recursively enumerable sets of positive integers and their decision problems , 1944 .

[9] John E. Savage,et al. Computational Work and Time on Finite Machines , 1972, JACM.