论文信息 - Every polynomial-time 1-degree collapses iff P=PSPACE

Every polynomial-time 1-degree collapses iff P=PSPACE

A set A is m-reducible (or Karp-reducible) to B if and only if there is a polynomial-time computable function f such that for all x, x in A if and only if f(x) in B. Two sets are 1-equivalent if each is m-reducible to the other by one-one reductions; p-invertible equivalent iff each is m-reducible to the other by one-one, polynomial-time invertible reductions; and p-isomorphic iff there is an m-reduction from one set to the other that is one-one, onto, and polynomial-time invertible. It is proved that the following statements are equivalent: (1) P=PSPACE. (2) Every two 1-equivalent sets are p-isomorphic. (3) Every two p-invertible equivalent sets are p-isomorphic.<<ETX>>

Stuart A. Kurtz | Stephen A. Fenner | James S. Royer

[1] Stuart A. Kurtz,et al. The Structure of Complete Degrees , 1990 .

[2] Juris Hartmanis,et al. On Isomorphisms and Density of NP and Other Complete Sets , 1977, SIAM J. Comput..

[3] Ding-Zhu Du,et al. On One-Way Functions and Polynomial-Time Isomorphisms , 1986, Theor. Comput. Sci..

[4] Charles H. Bennett. Time/Space Trade-Offs for Reversible Computation , 1989, SIAM J. Comput..

[5] L. Berman. Polynomial reducibilities and complete sets. , 1977 .

[6] Ding-Zhu Du,et al. A note on one-way functions and polynomial-time isomorphisms , 1986, STOC '86.

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

[8] Juris Hartmanis,et al. On isomorphisms and density of NP and other complete sets , 1976, STOC '76.

[9] Stuart A. Kurtz,et al. Collapsing degrees , 1986, 27th Annual Symposium on Foundations of Computer Science (sfcs 1986).

[10] D. C. Cooper,et al. Theory of Recursive Functions and Effective Computability , 1969, The Mathematical Gazette.

[11] Alan L. Selman,et al. Complexity Measures for Public-Key Cryptosystems , 1988, SIAM J. Comput..

[12] Ker-I Ko,et al. On Some Natural Complete Operators , 1985, Theor. Comput. Sci..