We exhibit an algorithm to compute the strongest polynomial (or algebraic) invariants that hold at each location of a given affine program (i.e., a program having only non-deterministic (as opposed to conditional) branching and all of whose assignments are given by affine expressions). Our main tool is an algebraic result of independent interest: given a finite set of rational square matrices of the same dimension, we show how to compute the Zariski closure of the semigroup that they generate
AbstractThis paper presents a method for automatically generating all polynomial invariants in simpl...
International audienceWe introduce a new method to compute non-convex invariants of numerical progra...
AbstractIn this paper, robust semi-definite programs are considered with the goal of verifying wheth...
We exhibit an algorithm to compute the strongest polynomial (or algebraic) invariants that hold at e...
We consider an abstraction of programs which preserves affine assignments exactly while conservative...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
We propose an abstract interpretation based method to compute polynomial invariants for imperative p...
AbstractA method for generating polynomial invariants of imperative programs is presented using the ...
www.cs.unm.edu/~kapur Abstract. A method for generating polynomial invariants of imperative programs...
AbstractLet G be an affine algebraic group acting on an affine variety X. We present an algorithm fo...
Invariance with respect to linear or affine transformations of the domain is arguably the most commo...
The discovery of invariants and ranking functions plays a central role in program verification. In o...
Abstract. The discovery of invariants and ranking functions plays a central role in program verifica...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
We study the problem of computing the maximal admissible positively invariant set for discrete time ...
AbstractThis paper presents a method for automatically generating all polynomial invariants in simpl...
International audienceWe introduce a new method to compute non-convex invariants of numerical progra...
AbstractIn this paper, robust semi-definite programs are considered with the goal of verifying wheth...
We exhibit an algorithm to compute the strongest polynomial (or algebraic) invariants that hold at e...
We consider an abstraction of programs which preserves affine assignments exactly while conservative...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
We propose an abstract interpretation based method to compute polynomial invariants for imperative p...
AbstractA method for generating polynomial invariants of imperative programs is presented using the ...
www.cs.unm.edu/~kapur Abstract. A method for generating polynomial invariants of imperative programs...
AbstractLet G be an affine algebraic group acting on an affine variety X. We present an algorithm fo...
Invariance with respect to linear or affine transformations of the domain is arguably the most commo...
The discovery of invariants and ranking functions plays a central role in program verification. In o...
Abstract. The discovery of invariants and ranking functions plays a central role in program verifica...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
We study the problem of computing the maximal admissible positively invariant set for discrete time ...
AbstractThis paper presents a method for automatically generating all polynomial invariants in simpl...
International audienceWe introduce a new method to compute non-convex invariants of numerical progra...
AbstractIn this paper, robust semi-definite programs are considered with the goal of verifying wheth...