We consider the problem of refining a parameter set to ensure that the behaviors of a dynamical system satisfy a given property. The dynamics are defined through parametric polynomial difference equations and their Bernstein representations are exploited to enclose reachable sets into parallelotopes. This allows us to achieve more accurate reachable set approximations with respect to previous works based on axis-aligned boxes. Moreover, we introduce a symbolical precomputation that leads to a significant improvement on time performances. Finally, we apply our framework to some epidemic models verifying the strength of the proposed method
Abstract:- The compartmental models using differential equations are basic models in epidemiology. T...
International audienceWe present a symbolic algorithmic approach that allows to compute invariant ma...
This paper is concerned with the problem of computing the bounded time reachable set of a polynomial...
Abstract. We consider the problem of refining a parameter set to ensure that the behaviors of a dyna...
Parameter determination is an important task in the de-velopment of biological models. In this paper...
Parameters are often used to tune mathematical models and capture nondeterminism and uncertainty in ...
Dynamical systems are important mathematical models used to describe the temporal evolution of syste...
Parametric dynamical systems emerge as a formalism for modeling natural and engineered systems rangi...
Dynamical systems are important mathematical models used to describe the temporal evolution of syste...
In this work we present parallelotope bundles, i.e., sets of parallelotopes for a symbolic represent...
Models of complex systems often consist of state variables with structurally similar dynamics that d...
We consider a problem from biological network analysis of determining regions in a parameter space o...
This work presents a general theory for the construction of a polyhedral outer approximation of the ...
The dynamics of biological processes are often modeled as systems of nonlinear ordinary differential...
International audienceThis work extends reachability analyses based on ellipsoidal techniques to Lin...
Abstract:- The compartmental models using differential equations are basic models in epidemiology. T...
International audienceWe present a symbolic algorithmic approach that allows to compute invariant ma...
This paper is concerned with the problem of computing the bounded time reachable set of a polynomial...
Abstract. We consider the problem of refining a parameter set to ensure that the behaviors of a dyna...
Parameter determination is an important task in the de-velopment of biological models. In this paper...
Parameters are often used to tune mathematical models and capture nondeterminism and uncertainty in ...
Dynamical systems are important mathematical models used to describe the temporal evolution of syste...
Parametric dynamical systems emerge as a formalism for modeling natural and engineered systems rangi...
Dynamical systems are important mathematical models used to describe the temporal evolution of syste...
In this work we present parallelotope bundles, i.e., sets of parallelotopes for a symbolic represent...
Models of complex systems often consist of state variables with structurally similar dynamics that d...
We consider a problem from biological network analysis of determining regions in a parameter space o...
This work presents a general theory for the construction of a polyhedral outer approximation of the ...
The dynamics of biological processes are often modeled as systems of nonlinear ordinary differential...
International audienceThis work extends reachability analyses based on ellipsoidal techniques to Lin...
Abstract:- The compartmental models using differential equations are basic models in epidemiology. T...
International audienceWe present a symbolic algorithmic approach that allows to compute invariant ma...
This paper is concerned with the problem of computing the bounded time reachable set of a polynomial...