Title :
The complexity of the theory of p-adic numbers
Author_Institution :
Dipartimento di Inf., Torino Univ., Italy
Abstract :
This paper addresses the question of the complexity of the decision problem for the theory Th(Qp) of p-adic numbers. The best known lower bound for the theory is double exponential alternating time with a linear number of alternations. I have designed an algorithm that determines the truth value of sentences of the theory requiring double exponential space. My algorithm is based on techniques used by G.E. Collins (1975) for the theory Th(R) of the reals, and on J. Denef´s work (1986) on semi-algebraic sets and cell decomposition for p-adic fields. No elementary upper bound had been previously established
Keywords :
computational complexity; decision theory; process algebra; symbol manipulation; cell decomposition; complexity; decision problem; double exponential alternating time; double exponential space; elementary upper bound; lower bound; p-adic numbers; semi-algebraic sets; Algebra; Application software; Computer science; Control systems; Digital arithmetic; Matrix decomposition; Roundoff errors; Sufficient conditions; Upper bound; Vocabulary;
Conference_Titel :
Foundations of Computer Science, 1993. Proceedings., 34th Annual Symposium on
Conference_Location :
Palo Alto, CA
Print_ISBN :
0-8186-4370-6
DOI :
10.1109/SFCS.1993.366846
