This paper reviews four variants of global Carleman weights that are especially adapted to some singular controllability and inverse problems in partial differential equations. These variants arise when studying: i) one measurement stationary source inverse problems for the heat equation with discontinuous coefficients, ii) one measurement stationary potential inverse problems for the heat equation with discontinuous coefficients, iii) null controllability for fluid-structure problems in mobile domains and iv) recovering coefficients from locally supported boundary observations for the wave equation. In all the case we explain how to explicitly construct the Carleman weight
Click on the DOI link to access the article (may not be free)This review paper describes some genera...
In this Note, we derive new Carleman inequalities for the evolution Schrodinger equation under a wea...
International audienceBaudouin and Puel (2002 Inverse Problems 18 1537-54), investigated some invers...
We review some recent results on variants of global Carleman weights and Carleman inequalities appli...
31 pagesInternational audienceIn this article, we extensively develop Carleman estimates for the wav...
We establish geometrical conditions for the inverse problem of determining a stationary potential in...
This book is a self-contained account of the method based on Carleman estimates for inverse problems...
Abstract. This paper has been conceived as an overview on the controllability properties of some rel...
31 pages. This version (4) is an expanded, corrected and translated-to-English version of hal-003517...
International audienceIn this Note, we derive new Carleman inequalities for the evolution Schrödinge...
AbstractWe derive global Carleman estimates for one-dimensional linear parabolic equations ∂t±∂x(c∂x...
In this article, we establish a Carleman estimate for the plate equation in order to solve an inver...
In this article, we discuss the methodology based on Carleman estimates concerning the unique contin...
International audienceWe consider a transmission wave equation in two embedded domains in $R^2$ , wh...
AbstractWe study the observability and some of its consequences (controllability, identification of ...
Click on the DOI link to access the article (may not be free)This review paper describes some genera...
In this Note, we derive new Carleman inequalities for the evolution Schrodinger equation under a wea...
International audienceBaudouin and Puel (2002 Inverse Problems 18 1537-54), investigated some invers...
We review some recent results on variants of global Carleman weights and Carleman inequalities appli...
31 pagesInternational audienceIn this article, we extensively develop Carleman estimates for the wav...
We establish geometrical conditions for the inverse problem of determining a stationary potential in...
This book is a self-contained account of the method based on Carleman estimates for inverse problems...
Abstract. This paper has been conceived as an overview on the controllability properties of some rel...
31 pages. This version (4) is an expanded, corrected and translated-to-English version of hal-003517...
International audienceIn this Note, we derive new Carleman inequalities for the evolution Schrödinge...
AbstractWe derive global Carleman estimates for one-dimensional linear parabolic equations ∂t±∂x(c∂x...
In this article, we establish a Carleman estimate for the plate equation in order to solve an inver...
In this article, we discuss the methodology based on Carleman estimates concerning the unique contin...
International audienceWe consider a transmission wave equation in two embedded domains in $R^2$ , wh...
AbstractWe study the observability and some of its consequences (controllability, identification of ...
Click on the DOI link to access the article (may not be free)This review paper describes some genera...
In this Note, we derive new Carleman inequalities for the evolution Schrodinger equation under a wea...
International audienceBaudouin and Puel (2002 Inverse Problems 18 1537-54), investigated some invers...