论文信息 - Computing over the Reals with Addition and Order: Higher Complexity Classes

Computing over the Reals with Addition and Order: Higher Complexity Classes

This paper deals with issues of structural complexity in a linear version of the Blum-Shub-Smale model of computation over the real numbers. Real versions of PSPACE and of the polynomial time hierarchy are defined, and their properties are investigated. Mainly two types of results are presented: ?Equivalence between quantification over the real numbers and over {0, 1};?Characterizations of recognizable subsets of {0, 1}* in terms of familiar discrete complexity classes. The complexity of the decision and quantifier elimination problems in the theory of the reals with addition and order is also studied.

Felipe Cucker | Pascal Koiran

[1] Pascal Koiran. A weak version of the Blum, Shub and Smale model , 1993, Proceedings of 1993 IEEE 34th Annual Foundations of Computer Science.

[2] José L. Balcázar,et al. Structural complexity 1 , 1988 .

[3] S. Smale,et al. On a theory of computation and complexity over the real numbers; np-completeness , 1989 .

[4] José L. Balcázar,et al. Structural complexity 2 , 1990 .

[5] J. Ferrante,et al. The computational complexity of logical theories , 1979 .

[6] Pascal Koiran. Computing over the Reals with Addition and Order , 1994, Theor. Comput. Sci..

[7] Wolfgang Maass,et al. Bounds for the computational power and learning complexity of analog neural nets , 1993, SIAM J. Comput..

[8] Felipe Cucker,et al. Separation of Complexity Classes in Koiran's Weak Model , 1994, Theor. Comput. Sci..

[9] Eduardo D. Sontag,et al. Real Addition and the Polynomial Hierarchy , 1985, Inf. Process. Lett..

[10] John B. Goode. Accessible Telephone Directories , 1994, J. Symb. Log..