Add to ORKGA brief introduction into the theory of differential inclusions, viability theory and selections of set valued mappings is presented. As an application the implicit scheme of the Leontief dynamic input-output model is considered
This chapter deals with theoretical and numerical results for solving qualitative and quantitative c...
: Necessary and sufficient conditions for the viability of differential games with linear dynamics a...
Set-valued analysis is an important component of the study of differential inclusions, which in turn...
An economic application of viability theory is presented. The continuous-time Leontieff model is con...
One of the problems that arises in the theory of evolution and control under uncertainty is to speci...
The paper deals with the problem of specifying the assembly of all solutions to a differential inclu...
Viability tubes and invariant tubes of a differential inclusion are defined and then used to build "...
The paper deals with the description of the bundle of viable trajectories for a differential inclusi...
Some theorems of viability theory which are relevant to nonlinear control problems with state constr...
The purpose of this paper is to study an elementary dynamic Keynesian model by means of the viabilit...
We describe four instances where set-valued maps intervene either as a tool to state the results or ...
The authors investigate a differential inclusion whose solutions have to remain in a given closed se...
This paper is devoted to the characterization of the tracking property connecting solutions to two d...
AbstractThis paper deals with the description of the viable trajectories bundle to a differential in...
We introduce the concept of viability domain of a set-valued map, which we study and use for providi...
This chapter deals with theoretical and numerical results for solving qualitative and quantitative c...
: Necessary and sufficient conditions for the viability of differential games with linear dynamics a...
Set-valued analysis is an important component of the study of differential inclusions, which in turn...
An economic application of viability theory is presented. The continuous-time Leontieff model is con...
One of the problems that arises in the theory of evolution and control under uncertainty is to speci...
The paper deals with the problem of specifying the assembly of all solutions to a differential inclu...
Viability tubes and invariant tubes of a differential inclusion are defined and then used to build "...
The paper deals with the description of the bundle of viable trajectories for a differential inclusi...
Some theorems of viability theory which are relevant to nonlinear control problems with state constr...
The purpose of this paper is to study an elementary dynamic Keynesian model by means of the viabilit...
We describe four instances where set-valued maps intervene either as a tool to state the results or ...
The authors investigate a differential inclusion whose solutions have to remain in a given closed se...
This paper is devoted to the characterization of the tracking property connecting solutions to two d...
AbstractThis paper deals with the description of the viable trajectories bundle to a differential in...
We introduce the concept of viability domain of a set-valued map, which we study and use for providi...
This chapter deals with theoretical and numerical results for solving qualitative and quantitative c...
: Necessary and sufficient conditions for the viability of differential games with linear dynamics a...
Set-valued analysis is an important component of the study of differential inclusions, which in turn...
