In order to verify semialgebraic programs, we automatize the Floyd/Naur/Hoare proof method. The main task is to automatically infer valid invariants and rank functions. First we express the program semantics in polynomial form. Then the unknown rank function and invariants are abstracted in parametric form. The implication in the Floyd/Naur/Hoare verification conditions is handled by abstraction into numerical constraints by Lagrangian relaxation. The remaining universal quantification is handled by semidefinite programming relaxation. Finally the parameters are computed using semidefinite programming solvers. This new approach exploits the recent progress in the numerical resolution of linear or bilinear matrix inequalities by semidefinite...
Abstract. We propose a new constraint-based approach to termination analysis, applicable to Logic Pr...
International audienceWe consider the general polynomial optimization problem $P: f^*=\min \{f(x)\,:...
Recently, the authors of this paper introduced a nonlinear transformation to convert the positive de...
In order to verify semialgebraic programs, we automatize the Floyd/Naur/Hoare proof method. The main...
A hierarchy of convex relaxations for semialgebraic problems is introduced. For questions reducible ...
AbstractTiwari (2004) proved that the termination problem of a class of linear programs (loops with ...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
In Semidefinite programming one minimizes a linear function sub-ject to the constraint that an affin...
We propose an abstract interpretation based method to compute polynomial invariants for imperative p...
International audienceThe traditional method for proving program termination consists in inferring a...
We consider the general feasibility problem for semidefinite programming: Determine whether a given ...
AbstractIn this paper, robust semi-definite programs are considered with the goal of verifying wheth...
The traditional method for proving program termination consists in inferring a ranking function. In ...
The Semidefinite Program (SDP) is a fundamental problem in mathematical programming. It covers a wid...
The discovery of invariants and ranking functions plays a central role in program verification. In o...
Abstract. We propose a new constraint-based approach to termination analysis, applicable to Logic Pr...
International audienceWe consider the general polynomial optimization problem $P: f^*=\min \{f(x)\,:...
Recently, the authors of this paper introduced a nonlinear transformation to convert the positive de...
In order to verify semialgebraic programs, we automatize the Floyd/Naur/Hoare proof method. The main...
A hierarchy of convex relaxations for semialgebraic problems is introduced. For questions reducible ...
AbstractTiwari (2004) proved that the termination problem of a class of linear programs (loops with ...
In semidefinite programming one minimizes a linear function subject to the constraint that an affine...
In Semidefinite programming one minimizes a linear function sub-ject to the constraint that an affin...
We propose an abstract interpretation based method to compute polynomial invariants for imperative p...
International audienceThe traditional method for proving program termination consists in inferring a...
We consider the general feasibility problem for semidefinite programming: Determine whether a given ...
AbstractIn this paper, robust semi-definite programs are considered with the goal of verifying wheth...
The traditional method for proving program termination consists in inferring a ranking function. In ...
The Semidefinite Program (SDP) is a fundamental problem in mathematical programming. It covers a wid...
The discovery of invariants and ranking functions plays a central role in program verification. In o...
Abstract. We propose a new constraint-based approach to termination analysis, applicable to Logic Pr...
International audienceWe consider the general polynomial optimization problem $P: f^*=\min \{f(x)\,:...
Recently, the authors of this paper introduced a nonlinear transformation to convert the positive de...