Integer octagonal constraints (a.k.a. Unit Two Variables Per Inequality or UTVPI integer constraints) constitute an interesting class of constraints for the representation and solution of integer problems in the fields of constraint programming and formal analysis and verification of software and hardware systems, since they couple algorithms having polynomial complexity with a relatively good expressive power. The main algorithms required for the manipulation of such constraints are the satisfiability check and the computation of the inferential closure of a set of constraints. The latter is called tight closure to mark the difference with the (incomplete) closure algorithm that does not exploit the integrality of the variables. In this pa...
We show that a 2-variable integer program, defined by m constraints involving coefficients with at m...
We show that a 2-variable integer program, defined by $m$ constraints involving coefficients with at...
This paper proposes an algorithm to reason on constraints expressed in terms of polynomials with int...
We consider the satisfiability problem for Boolean combinations of unit two variable per inequality ...
International audienceThe octagon abstract domain, devoted to discovering octagonal constraints (als...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
We use integer programming (IP) and constraint programming (CP) to search for sets of mutually ortho...
An algorithm is presented for solving families of integer linear programming problems in which the p...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
International audienceComputing transitive closures of integer relations is the key tofinding precis...
Abstract. Computing transitive closures of integer relations is the key to find-ing precise invarian...
This thesis examines the Orthogonal Latin Squares (OLS) problem from the viewpoint of Integer and Co...
Many program analysis techniques are based on manipulations of sets of integers bounded by linear co...
We show that a 2-variable integer program, defined by m constraints involving coefficients with at m...
We show that a 2-variable integer program, defined by $m$ constraints involving coefficients with at...
This paper proposes an algorithm to reason on constraints expressed in terms of polynomials with int...
We consider the satisfiability problem for Boolean combinations of unit two variable per inequality ...
International audienceThe octagon abstract domain, devoted to discovering octagonal constraints (als...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
We use integer programming (IP) and constraint programming (CP) to search for sets of mutually ortho...
An algorithm is presented for solving families of integer linear programming problems in which the p...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
International audienceComputing transitive closures of integer relations is the key tofinding precis...
Abstract. Computing transitive closures of integer relations is the key to find-ing precise invarian...
This thesis examines the Orthogonal Latin Squares (OLS) problem from the viewpoint of Integer and Co...
Many program analysis techniques are based on manipulations of sets of integers bounded by linear co...
We show that a 2-variable integer program, defined by m constraints involving coefficients with at m...
We show that a 2-variable integer program, defined by $m$ constraints involving coefficients with at...
This paper proposes an algorithm to reason on constraints expressed in terms of polynomials with int...