International audienceThis paper describes a novel decision procedure for quantifier-free linear integer arithmetic. Standard techniques usually relax the initial problem to the rational domain and then proceed either by projection (e.g. Omega-Test) or by branching/cutting methods (branch-and-bound, branch-and-cut, Gomory cuts). Our approach tries to bridge the gap between the two techniques: it interleaves an exhaustive search for a model with bounds inference. These bounds are computed provided an oracle capable of finding constant positive linear combinations of affine forms. We also show how to design an efficient oracle based on the Simplex procedure. Our algorithm is proved sound, complete, and terminating and is implemented in the Al...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
International audienceThis paper describes a novel decision procedure for quantifier-free linear int...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
International audienceWe consider the decision problem for quantifier-free formulas whose atoms are ...
In this thesis, we present new decision procedures for linear arithmetic in the context of SMT solve...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We present new methods for solving the Satisfiability Modulo Theories problem over the theory of Qua...
International audienceWe consider feasibility of linear integer problems in the context of verificat...
Linear arithmetic constraints in the form of equalities and inequalities constitute the vast majorit...
We propose a new quantifier elimination algorithm for the theory of linear real arithmetic. This alg...
Abstract—The de facto standard for state-of-the-art real and integer linear reasoning within Satisfi...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
International audienceThis paper describes a novel decision procedure for quantifier-free linear int...
This paper describes how the Fourier-Motzkin Elimination Method, which can be used for solving Linea...
AbstractThis paper describes how the Fourier-Motzkin Elimination Method, which can be used for solvi...
International audienceWe consider the decision problem for quantifier-free formulas whose atoms are ...
In this thesis, we present new decision procedures for linear arithmetic in the context of SMT solve...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We present new methods for solving the Satisfiability Modulo Theories problem over the theory of Qua...
International audienceWe consider feasibility of linear integer problems in the context of verificat...
Linear arithmetic constraints in the form of equalities and inequalities constitute the vast majorit...
We propose a new quantifier elimination algorithm for the theory of linear real arithmetic. This alg...
Abstract—The de facto standard for state-of-the-art real and integer linear reasoning within Satisfi...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
AbstractIt is shown how the dual of Fourier–Motzkin elimination can be applied to eliminating the co...
Abstract. Craig interpolation has become a key ingredient in many symbolic model checkers, serving a...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....