Andreka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation algebras-those with at most 8 elements, or in other terms, at most 3 atomic relations. They showed that there are eighteen isomorphism types of small relation algebras, all representable. For each simple, small relation algebra they computed the spectrum of the algebra, namely the set of cardinalities of square representations of that relation algebra. In this paper we analyze the computational complexity of the problem of deciding the satisfiability of a finite set of constraints built on any small relation algebra. We give a complete classification of the complexities of the general constraint satisfaction problem for small relation algebras. For t...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
. Some constraint languages are more powerful than others because they allow us to express a larger ...
The Counting Constraint Satisfaction Problem (#CSP(H)) over a nite relational structure H can be exp...
AbstractAndréka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation al...
Network satisfaction problems (NSPs) for finite relation algebras are computational decision problem...
Many natural combinatorial problems can be expressed as constraint satisfaction problems. This class...
Robin Hirsch posed in 1996 the Really Big Complexity Problem: classify the computational complexity ...
In this paper we explore the links between constraint satisfaction problems and universal algebra. ...
International audienceThe computational complexity of the constraint satisfaction problem (CSP) with...
Many natural combinatorial problems can be expressed as constraint satisfaction problems. This class...
Many computational problems arising in artificial intelligence, computer science and elsewhere can b...
Many computational problems arising in artificial intelligence, computer science and elsewhere can b...
AbstractWe present algebraic conditions on constraint languages Γ that ensure the hardness of the co...
The universal-algebraic approach has proved a powerful tool in the study of the computational comple...
Most previous theoretical study of the complexity of the constraint satisfaction problem has conside...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
. Some constraint languages are more powerful than others because they allow us to express a larger ...
The Counting Constraint Satisfaction Problem (#CSP(H)) over a nite relational structure H can be exp...
AbstractAndréka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation al...
Network satisfaction problems (NSPs) for finite relation algebras are computational decision problem...
Many natural combinatorial problems can be expressed as constraint satisfaction problems. This class...
Robin Hirsch posed in 1996 the Really Big Complexity Problem: classify the computational complexity ...
In this paper we explore the links between constraint satisfaction problems and universal algebra. ...
International audienceThe computational complexity of the constraint satisfaction problem (CSP) with...
Many natural combinatorial problems can be expressed as constraint satisfaction problems. This class...
Many computational problems arising in artificial intelligence, computer science and elsewhere can b...
Many computational problems arising in artificial intelligence, computer science and elsewhere can b...
AbstractWe present algebraic conditions on constraint languages Γ that ensure the hardness of the co...
The universal-algebraic approach has proved a powerful tool in the study of the computational comple...
Most previous theoretical study of the complexity of the constraint satisfaction problem has conside...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
. Some constraint languages are more powerful than others because they allow us to express a larger ...
The Counting Constraint Satisfaction Problem (#CSP(H)) over a nite relational structure H can be exp...