International audienceThis paper studies stability properties of the solutions of optimal control problems for linear systems. The analysis is based on an adapted concept of metric regularity, the strong bi-metric regularity, which is introduced and investigated in the paper. It allows one to give a more precise description of the effect of perturbations on the optimal solutions in terms of a Hölder-type estimate and to investigate the robustness of this estimate. The Hölder exponent depends on a natural number $k$, which is known as the controllability index of the reference solution. An inverse function theorem for strongly bi-metrically regular mappings is obtained, which is used in the case $k=1$ for proving stability of the solution of...
The paper concerns the study of variational systems described by parameterized generalized equations...
The inverse linear quadratic optimal problem for singularly perturbed system is considered in this p...
In this thesis, questions in the analysis and synthesis of stability robustness properties for linea...
International audienceThis paper studies stability properties of the solutions of optimal control pr...
The paper investigates the Lipschitz/Hölder stability with respect to perturbations of optimal contr...
The paper investigates the property of Strong Metric sub-Regularity (SMsR) of the mapping representi...
Most of traditional robust problems focus on developing a robust controller to stabilize the dynamic...
AbstractWe aim to quantify the stability of systems of (possibly infinitely many) linear inequalitie...
This paper is concerned with the Lipschitzian behavior of the optimal set of convex semi-infinite op...
The authors show how geometric ideas can be applied in control theory and in particular in robust co...
This paper is a kind of biased survey of the most representative and recent results on stability for...
Although the property of strong metric subregularity of set-valued mappings has been present in the ...
Different from the inverse problem put forward by R. E. Kalman, another kind ofinverse problem of li...
A stability theorem, based on the concept of directional matric regularity of mappings is described....
The problem considered in the paper can be described as follows. We are given a continuous mapping f...
The paper concerns the study of variational systems described by parameterized generalized equations...
The inverse linear quadratic optimal problem for singularly perturbed system is considered in this p...
In this thesis, questions in the analysis and synthesis of stability robustness properties for linea...
International audienceThis paper studies stability properties of the solutions of optimal control pr...
The paper investigates the Lipschitz/Hölder stability with respect to perturbations of optimal contr...
The paper investigates the property of Strong Metric sub-Regularity (SMsR) of the mapping representi...
Most of traditional robust problems focus on developing a robust controller to stabilize the dynamic...
AbstractWe aim to quantify the stability of systems of (possibly infinitely many) linear inequalitie...
This paper is concerned with the Lipschitzian behavior of the optimal set of convex semi-infinite op...
The authors show how geometric ideas can be applied in control theory and in particular in robust co...
This paper is a kind of biased survey of the most representative and recent results on stability for...
Although the property of strong metric subregularity of set-valued mappings has been present in the ...
Different from the inverse problem put forward by R. E. Kalman, another kind ofinverse problem of li...
A stability theorem, based on the concept of directional matric regularity of mappings is described....
The problem considered in the paper can be described as follows. We are given a continuous mapping f...
The paper concerns the study of variational systems described by parameterized generalized equations...
The inverse linear quadratic optimal problem for singularly perturbed system is considered in this p...
In this thesis, questions in the analysis and synthesis of stability robustness properties for linea...