International audienceA semilinear relation is a finite union of finite intersections of open and closed half-spaces over, for instance, the reals, the rationals, or the integers. Semilinear relations have been studied in connection with algebraic geometry, automata theory, and spatiotemporal reasoning. We consider semilinear relations over the rationals and the reals. Under this assumption, the computational complexity of the constraint satisfaction problem (CSP) is known for all finite sets containing R + = {(x, y, z) | x + y = z}, ≤, and {1}. These problems correspond to expansions of the linear programming feasibility problem. We generalise this result and fully determine the complexity for all finite sets of semilinear relations contai...
We study the computational complexity of constraint satisfaction problems that are based on integer ...
International audienceWe study techniques for deciding the computational complexity of infinite-doma...
Andreka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation algebras-t...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
A semilinear relation is a finite union of finite intersections of open and closed half spaces over,...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
International audienceThe computational complexity of the constraint satisfaction problem (CSP) with...
International audienceLet \Gamma be a structure with a finite relational signature and a first-order...
A semilinear relation S â ân is max-closed if it is preserved by taking the componentwise maximum. T...
A semilinear relation (Formula presented.) is max-closed if it is preserved by taking the componentw...
Given a finite set of vectors over a finite totally ordered domain, we study the problem of computin...
We present a survey of complexity results for constraint satisfaction problems (CSPs) over the integ...
A distance constraint satisfaction problem is a constraint satisfaction problem (CSP) whose constrai...
International audienceA famous result by Jeavons, Cohen, and Gyssens shows that every constraint sat...
International audienceGiven a finite set of vectors over a finite totally ordered domain, we study t...
We study the computational complexity of constraint satisfaction problems that are based on integer ...
International audienceWe study techniques for deciding the computational complexity of infinite-doma...
Andreka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation algebras-t...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
A semilinear relation is a finite union of finite intersections of open and closed half spaces over,...
International audienceA semilinear relation is a finite union of finite intersections of open and cl...
International audienceThe computational complexity of the constraint satisfaction problem (CSP) with...
International audienceLet \Gamma be a structure with a finite relational signature and a first-order...
A semilinear relation S â ân is max-closed if it is preserved by taking the componentwise maximum. T...
A semilinear relation (Formula presented.) is max-closed if it is preserved by taking the componentw...
Given a finite set of vectors over a finite totally ordered domain, we study the problem of computin...
We present a survey of complexity results for constraint satisfaction problems (CSPs) over the integ...
A distance constraint satisfaction problem is a constraint satisfaction problem (CSP) whose constrai...
International audienceA famous result by Jeavons, Cohen, and Gyssens shows that every constraint sat...
International audienceGiven a finite set of vectors over a finite totally ordered domain, we study t...
We study the computational complexity of constraint satisfaction problems that are based on integer ...
International audienceWe study techniques for deciding the computational complexity of infinite-doma...
Andreka and Maddux [Notre Dame J. Formal Logic 35 (4) 1994] classified the small relation algebras-t...