Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relationships. These inequalities express inter-variable relationships that are quantified by the ratios between the variable coefficients. However, linear inequalities over a non-negative variable domain with only unit variable coefficients and no constants other than zero can represent relationships that can be valid in non-numeric domains. For instance, if variables are either non-negative or zero itself, that is, a strictly two-point domain, then 0 <= x, 0 <= y, x <= y, expresses a dependency between x and y, since if y is known to be zero, then so is x. By defining an abstraction operator that effectively puts aside the scaling coeff...
AbstractThis note gives several geometric cone relations for arbitrary polyhedron with a regular dec...
We consider the following classes of quantified formulas. Fix a set of basic relations called a basi...
AbstractBoolean games are a logical setting for representing static games in a succinct way, taking ...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
International audienceWe propose a new relational abstract domain for analysing programs with numeri...
We systematically study how properties of abstract operator systems help classifying linear matrix i...
International audienceLinear relation analysis (polyhedral analysis), devoted to discovering linear ...
A bimonotone linear inequality is a linear inequality with at most two nonzero coefficients that are...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
Diagrammatic reasoning has been successful in many areas of sciences, from engineering to computer s...
International audienceWe study the problem of how to compute the boolean abstraction of the solution...
AbstractIf the collection of all real-valued functions defined on a finite partially ordered set S o...
summary:Algebraic bounds of Fréchet classes of copulas can be derived from the fundamental attribute...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
AbstractA set function is a function whose domain is the power set of a set, which is assumed to be ...
AbstractThis note gives several geometric cone relations for arbitrary polyhedron with a regular dec...
We consider the following classes of quantified formulas. Fix a set of basic relations called a basi...
AbstractBoolean games are a logical setting for representing static games in a succinct way, taking ...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
International audienceWe propose a new relational abstract domain for analysing programs with numeri...
We systematically study how properties of abstract operator systems help classifying linear matrix i...
International audienceLinear relation analysis (polyhedral analysis), devoted to discovering linear ...
A bimonotone linear inequality is a linear inequality with at most two nonzero coefficients that are...
AbstractA bimonotone linear inequality is a linear inequality with at most two nonzero coefficients ...
Diagrammatic reasoning has been successful in many areas of sciences, from engineering to computer s...
International audienceWe study the problem of how to compute the boolean abstraction of the solution...
AbstractIf the collection of all real-valued functions defined on a finite partially ordered set S o...
summary:Algebraic bounds of Fréchet classes of copulas can be derived from the fundamental attribute...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
AbstractA set function is a function whose domain is the power set of a set, which is assumed to be ...
AbstractThis note gives several geometric cone relations for arbitrary polyhedron with a regular dec...
We consider the following classes of quantified formulas. Fix a set of basic relations called a basi...
AbstractBoolean games are a logical setting for representing static games in a succinct way, taking ...