DocumentCode
2529604
Title
Satisfiability of word equations with constants is in exponential space
Author
Gutiérrez, Claudio
Author_Institution
Dept. of Math., Wesleyan Univ., Middletown, CT, USA
fYear
1998
fDate
8-11 Nov 1998
Firstpage
112
Lastpage
119
Abstract
In this paper we study solvability of equations over free semigroups, known as word equations, particularly G.S. Makanin´s algorithm (1977), a general procedure to decide if a word equation has a solution. The upper bound time-complexity of Makanin´s original decision procedure was quadruple exponential in the length of the equation, as shown by Jaffar. A. Koscielski and L. Pacholski (1996) reduced it to triple exponential, and conjectured that it could be brought down to double exponential. The present paper proves this conjecture. In fact we prove the stronger fact that its space-complexity is single exponential
Keywords
computability; computational complexity; exponential space; free semigroups; satisfiability; space-complexity; upper bound time-complexity; word equations; Algebra; Artificial intelligence; Automata; Computer science; Differential equations; Informatics; Length measurement; Logic; Polynomials; Upper bound;
fLanguage
English
Publisher
ieee
Conference_Titel
Foundations of Computer Science, 1998. Proceedings. 39th Annual Symposium on
Conference_Location
Palo Alto, CA
ISSN
0272-5428
Print_ISBN
0-8186-9172-7
Type
conf
DOI
10.1109/SFCS.1998.743434
Filename
743434
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