International audienceWe present three new methods that investigate the equalities implied by a system of linear arithmetic constraints. Implied equalities can be used to simplify linear arithmetic constraints and are valuable in the context of Nelson-Oppen style combinations of theories. The first method efficiently checks whether a system of linear arithmetic constraints implies an equality at all. In case the system does, the method also returns a valid equality as an explanation. The second method uses the first method to compute a basis for all implied equalities, i.e., a finite representation of all equalities implied by the linear arithmetic constraints. The third method uses the second method to check efficiently whether a system of...
This thesis presents a probabilistic algorithm for the solution of system of homogeneous linear ineq...
Subclasses of linear inequalities where each inequality has at most two variables are popular in abs...
AbstractInductive theorems are properties valid in the initial algebra. A now popular tool for provi...
International audienceWe present several new techniques for linear arithmetic constraint solving. Th...
Linear arithmetic constraints in the form of equalities and inequalities constitute the vast majorit...
AbstractThe paper presents an incremental and efficient algorithm for testing the satisfiability of ...
International audienceWe present two tests that solve linear integer arithmetic constraints. These t...
In this thesis we present a solution to the interpolation problem of LA(Z) based on interpolant gene...
AbstractWe give a method of constructing an interpolant for linear equality, and inequality constrai...
AbstractThe negation of equality is an important relation that arises naturally in the study of equa...
AbstractWe consider the problem of finding irredundant bases for inconsistent sets of equalities and...
In this paper we present a new decision procedure for the satisfiability of Linear Arithmetic Logic ...
This paper explores the spatial domain of sets of inequalities where each inequality contains at mos...
In this thesis, we present new decision procedures for linear arithmetic in the context of SMT solve...
AbstractIn this paper, we present an algorithm for solving directly linear Diophantine systems of bo...
This thesis presents a probabilistic algorithm for the solution of system of homogeneous linear ineq...
Subclasses of linear inequalities where each inequality has at most two variables are popular in abs...
AbstractInductive theorems are properties valid in the initial algebra. A now popular tool for provi...
International audienceWe present several new techniques for linear arithmetic constraint solving. Th...
Linear arithmetic constraints in the form of equalities and inequalities constitute the vast majorit...
AbstractThe paper presents an incremental and efficient algorithm for testing the satisfiability of ...
International audienceWe present two tests that solve linear integer arithmetic constraints. These t...
In this thesis we present a solution to the interpolation problem of LA(Z) based on interpolant gene...
AbstractWe give a method of constructing an interpolant for linear equality, and inequality constrai...
AbstractThe negation of equality is an important relation that arises naturally in the study of equa...
AbstractWe consider the problem of finding irredundant bases for inconsistent sets of equalities and...
In this paper we present a new decision procedure for the satisfiability of Linear Arithmetic Logic ...
This paper explores the spatial domain of sets of inequalities where each inequality contains at mos...
In this thesis, we present new decision procedures for linear arithmetic in the context of SMT solve...
AbstractIn this paper, we present an algorithm for solving directly linear Diophantine systems of bo...
This thesis presents a probabilistic algorithm for the solution of system of homogeneous linear ineq...
Subclasses of linear inequalities where each inequality has at most two variables are popular in abs...
AbstractInductive theorems are properties valid in the initial algebra. A now popular tool for provi...