Known algorithms for manipulating octagons do not preserve their sparsity, leading typically to quadratic or cubic time and space complexities even if no relation among variables is known when they are all bounded. In this paper, we present new algorithms, which use and return octagons represented as weakly closed difference bound matrices, preserve the sparsity of their input and have better performance in the case their inputs are sparse. We prove that these algorithms are as precise as the known ones
Sparse input data is data in which most of the data coefficients are zero. Many areas of scientific ...
An interesting area in static analysis is the study of numeric properties. Complex properties can be...
The mathematical models of many practical problems lead to systems of linear algebraic equations wh...
International audienceKnown algorithms for manipulating octagons do not preserve their sparsity, lea...
Abstract. This article presents the octagon abstract domain, a relational numerical abstract domain ...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
Numerical abstract domains are a fundamental component in mod-ern static program analysis and are us...
Weakly relational numeric domains express restricted classes of linear inequalities that strike a ba...
AbstractThe numerical treatment of many mathematical models (which arise, for example, in physics, c...
We consider a function g : ! n ! ! n for which the Jacobian is symmetric and sparse. Such functi...
International audienceThis paper presents a new numerical abstract domain for static analysis by abs...
Abstract. This paper presents a new numerical abstract domain for static analysis by abstract interp...
Octagons have enduring appeal because their domain opera- tions are simple, readily mapping to for-l...
AbstractRelational numerical abstract domains do not scale up. To ensure a linear cost of abstract d...
Sparse input data is data in which most of the data coefficients are zero. Many areas of scientific ...
An interesting area in static analysis is the study of numeric properties. Complex properties can be...
The mathematical models of many practical problems lead to systems of linear algebraic equations wh...
International audienceKnown algorithms for manipulating octagons do not preserve their sparsity, lea...
Abstract. This article presents the octagon abstract domain, a relational numerical abstract domain ...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
Numerical abstract domains are a fundamental component in mod-ern static program analysis and are us...
Weakly relational numeric domains express restricted classes of linear inequalities that strike a ba...
AbstractThe numerical treatment of many mathematical models (which arise, for example, in physics, c...
We consider a function g : ! n ! ! n for which the Jacobian is symmetric and sparse. Such functi...
International audienceThis paper presents a new numerical abstract domain for static analysis by abs...
Abstract. This paper presents a new numerical abstract domain for static analysis by abstract interp...
Octagons have enduring appeal because their domain opera- tions are simple, readily mapping to for-l...
AbstractRelational numerical abstract domains do not scale up. To ensure a linear cost of abstract d...
Sparse input data is data in which most of the data coefficients are zero. Many areas of scientific ...
An interesting area in static analysis is the study of numeric properties. Complex properties can be...
The mathematical models of many practical problems lead to systems of linear algebraic equations wh...