It is known that the existential theory of equations in free groups is decidable. This is a famous result of Makanin. On the other hand it has been shown that the scheme of his algorithm is not primitive recursive. In this paper we present an algorithm that works in polynomial space, even in the more general setting where each variable has a rational constraint, that is, the solution has to respect a speci cation given by a regular word language. Our main result states that the existential theory of equations in free groups with rational constraints is PSPACE{complete. We obtain this result as a corollary of the corresponding statement about free monoids with involution
© Laura Ciobanu and Murray Elder; licensed under Creative Commons License CC-BY We show that the ful...
AbstractWe investigate the complexity of algorithmic problems on finitely generated subgroups of fre...
In this dissertation, we study the solvability of equations in the free inverse monoid generated by ...
It is well-known that the existential theory of equations in free groups is decidable. This is a cel...
AbstractIt is well-known that the existential theory of equations in free groups is decidable. This ...
Abstract. The aim of this paper is to present a PSPACE algorithm which yields a finite graph of expo...
The aim of this paper is to describe the set of all solutions of equations in free groups and monoid...
We show that, given a word equation over a finitely generated free group, the set of all solutions i...
Wir beweisen, daß das Erfüllbarkeitsproblem für Gleichungen mit regulären Randbedingungen über freie...
© Volker Diekert, Artur Jez, and Manfred Kufleitner. We give NSPACE(n log n) algorithms solving the ...
We prove that the full solution set of a twisted word equation with regular constraints is an EDT0L...
AbstractA free semigroup with involution (FSI) is essentially the set of words over a given alphabet...
We give NSPACE(n*log(n)) algorithms solving the following decision problems. Satisfiability: Is the ...
© Volker Diekert and Murray Elder; 1998 ACM Subject Classification F.2.2 Nonnumerical Algorithms and...
We give a self-contained proof of a fundamental result of Makanin (1977), which solves the satisfiab...
© Laura Ciobanu and Murray Elder; licensed under Creative Commons License CC-BY We show that the ful...
AbstractWe investigate the complexity of algorithmic problems on finitely generated subgroups of fre...
In this dissertation, we study the solvability of equations in the free inverse monoid generated by ...
It is well-known that the existential theory of equations in free groups is decidable. This is a cel...
AbstractIt is well-known that the existential theory of equations in free groups is decidable. This ...
Abstract. The aim of this paper is to present a PSPACE algorithm which yields a finite graph of expo...
The aim of this paper is to describe the set of all solutions of equations in free groups and monoid...
We show that, given a word equation over a finitely generated free group, the set of all solutions i...
Wir beweisen, daß das Erfüllbarkeitsproblem für Gleichungen mit regulären Randbedingungen über freie...
© Volker Diekert, Artur Jez, and Manfred Kufleitner. We give NSPACE(n log n) algorithms solving the ...
We prove that the full solution set of a twisted word equation with regular constraints is an EDT0L...
AbstractA free semigroup with involution (FSI) is essentially the set of words over a given alphabet...
We give NSPACE(n*log(n)) algorithms solving the following decision problems. Satisfiability: Is the ...
© Volker Diekert and Murray Elder; 1998 ACM Subject Classification F.2.2 Nonnumerical Algorithms and...
We give a self-contained proof of a fundamental result of Makanin (1977), which solves the satisfiab...
© Laura Ciobanu and Murray Elder; licensed under Creative Commons License CC-BY We show that the ful...
AbstractWe investigate the complexity of algorithmic problems on finitely generated subgroups of fre...
In this dissertation, we study the solvability of equations in the free inverse monoid generated by ...