AbstractWe prove that several problems concerning congruences on algebras are complete for nondeterministic log-space. These problems are: determining the congruence on a given algebra generated by a set of pairs, and determining whether a given algebra is simple or subdirectly irreducible. We also consider the problem of determining the smallest fully invariant congruence on a given algebra containing a given set of pairs. We prove that this problem is complete for nondeterministic polynomial time
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
AbstractIn this paper we survey some problems which have recently appeared in the study of the compl...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We prove that several problems concerning congruences on algebras are complete for nondeterministic ...
AbstractWe prove that several problems concerning congruences on algebras are complete for nondeterm...
The CSP (constraint satisfaction problems) is a class of problems deciding whether there exists a ho...
AbstractFast algorithms are presented which find the minimal nontrivial congruences, subalgebras, an...
Ph.D. University of Hawaii at Manoa 2014.Includes bibliographical references.We analyze computable a...
AbstractThis paper describes an algorithm for determining whether two polyhedra are congruent. The a...
We show that deciding whether an algebraic variety has an irreducible component of codimension at le...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
AbstractGiven an arbitrary finite Church-Rosser Thue system S, it is shown that the question of whet...
In this paper, we study the computational complexity of computing the noncommutative determinant. We...
Abstract. This paper studies the complexity of determining if a finite algebra generates a variety t...
Abstract. The computational complexity of the provability problem in systems of modal proposi-tional...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
AbstractIn this paper we survey some problems which have recently appeared in the study of the compl...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We prove that several problems concerning congruences on algebras are complete for nondeterministic ...
AbstractWe prove that several problems concerning congruences on algebras are complete for nondeterm...
The CSP (constraint satisfaction problems) is a class of problems deciding whether there exists a ho...
AbstractFast algorithms are presented which find the minimal nontrivial congruences, subalgebras, an...
Ph.D. University of Hawaii at Manoa 2014.Includes bibliographical references.We analyze computable a...
AbstractThis paper describes an algorithm for determining whether two polyhedra are congruent. The a...
We show that deciding whether an algebraic variety has an irreducible component of codimension at le...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
AbstractGiven an arbitrary finite Church-Rosser Thue system S, it is shown that the question of whet...
In this paper, we study the computational complexity of computing the noncommutative determinant. We...
Abstract. This paper studies the complexity of determining if a finite algebra generates a variety t...
Abstract. The computational complexity of the provability problem in systems of modal proposi-tional...
. We refine the techniques of Beigel, Gill, Hertrampf [4] who investigated polynomial time counting ...
AbstractIn this paper we survey some problems which have recently appeared in the study of the compl...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...