abstract: A computational framework based on convex optimization is presented for stability analysis of systems described by Partial Differential Equations (PDEs). Specifically, two forms of linear PDEs with spatially distributed polynomial coefficients are considered. The first class includes linear coupled PDEs with one spatial variable. Parabolic, elliptic or hyperbolic PDEs with Dirichlet, Neumann, Robin or mixed boundary conditions can be reformulated in order to be used by the framework. As an example, the reformulation is presented for systems governed by Schr¨odinger equation, parabolic type, relativistic heat conduction PDE and acoustic wave equation, hyperbolic types. The second form of PDEs of interest are scalar-valued with tw...
The thesis investigates control problems for two types of partial differential equations. The first ...
This manuscript presents new results on the stability analysis for a classof linear hyperbolic Parti...
Lyapunov's 2nd method can be formulated as a convex optimization problem by means of Sum-of-Squares ...
In this dissertation, computational methods based on convex optimization, for the analysis of syste...
International audienceWe present a method for the stability analysis of a large class of linear Part...
International audienceWe consider the stability analysis of a large class of linear 1-D PDEs with po...
We present a computational framework for stability analysis of systems of coupled linear Partial-Dif...
This thesis concerns the scalable application of convex optimization to data-driven modeling of dyna...
This work presents a convex-optimization-based framework for analysis and control of nonlinear parti...
This thesis is a study of stable perturbations in convex programming models. Stability of a general ...
Abstract\u2014Backstepping design for boundary linear PDE is formulated as a convex optimization pro...
International audienceFor families of partial differential equations (PDEs) with particular boundary...
The dissertation concerns a systematic study of full stability in general optimization models includ...
A stability criterion for nonlinear systems, derived by the first author (2000), can be viewed as a ...
International audienceIn this paper, we consider the problems of stability analysis and control synt...
The thesis investigates control problems for two types of partial differential equations. The first ...
This manuscript presents new results on the stability analysis for a classof linear hyperbolic Parti...
Lyapunov's 2nd method can be formulated as a convex optimization problem by means of Sum-of-Squares ...
In this dissertation, computational methods based on convex optimization, for the analysis of syste...
International audienceWe present a method for the stability analysis of a large class of linear Part...
International audienceWe consider the stability analysis of a large class of linear 1-D PDEs with po...
We present a computational framework for stability analysis of systems of coupled linear Partial-Dif...
This thesis concerns the scalable application of convex optimization to data-driven modeling of dyna...
This work presents a convex-optimization-based framework for analysis and control of nonlinear parti...
This thesis is a study of stable perturbations in convex programming models. Stability of a general ...
Abstract\u2014Backstepping design for boundary linear PDE is formulated as a convex optimization pro...
International audienceFor families of partial differential equations (PDEs) with particular boundary...
The dissertation concerns a systematic study of full stability in general optimization models includ...
A stability criterion for nonlinear systems, derived by the first author (2000), can be viewed as a ...
International audienceIn this paper, we consider the problems of stability analysis and control synt...
The thesis investigates control problems for two types of partial differential equations. The first ...
This manuscript presents new results on the stability analysis for a classof linear hyperbolic Parti...
Lyapunov's 2nd method can be formulated as a convex optimization problem by means of Sum-of-Squares ...