AbstractWe use Carleman estimates and the concatenation technique to show that, starting from operators for which the local uniqueness in the characteristic Cauchy problem does not hold, many of their perturbations do have this property of uniqueness
AbstractCarleman estimates are an indispensable tool for proving uniqueness of continuation for solu...
Não disponívelF. Trèves, in [T2], applied the Concatenation Method and Carleman\'s Method to show u...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1989.Title as it appea...
AbstractWe use Carleman estimates and the concatenation technique to show that, starting from operat...
AbstractStarting from operators for which the local uniqueness to the characteristic Cauchy problem ...
AbstractFor the operator P(c1, c2) = (∂x + a1xk∂y + a2xk)(∂x − b1xk∂y − b2xk) − c1xk−1∂y − c2xk−1 wi...
International audienceOn a closed manifold, we give a quantitative Carleman estimate on the Schrödin...
Using Carleman estimates, we give a lower bound for solutions to the discrete Schrödinger equation i...
The problem of the uniqueness in the Cauchy problem is a fundamental problem in a theory of partial ...
AbstractLocal uniqueness of solutions to the Cauchy problem is shown for certain classes of operator...
In this paper, we establish some new L2 − L2 Carleman estimates for the Baouendi–Grushin operators B...
AbstractA study of local strong uniqueness is given. Concepts of local strong uniqueness and directi...
In this paper we consider the non-uniqueness and the uniqueness property for the solutions to the Ca...
Local and global Carleman estimates play a central role in the study of some partial differential eq...
The paper contains a generalization of Calderón's theorem on the local uniqueness of the solutions o...
AbstractCarleman estimates are an indispensable tool for proving uniqueness of continuation for solu...
Não disponívelF. Trèves, in [T2], applied the Concatenation Method and Carleman\'s Method to show u...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1989.Title as it appea...
AbstractWe use Carleman estimates and the concatenation technique to show that, starting from operat...
AbstractStarting from operators for which the local uniqueness to the characteristic Cauchy problem ...
AbstractFor the operator P(c1, c2) = (∂x + a1xk∂y + a2xk)(∂x − b1xk∂y − b2xk) − c1xk−1∂y − c2xk−1 wi...
International audienceOn a closed manifold, we give a quantitative Carleman estimate on the Schrödin...
Using Carleman estimates, we give a lower bound for solutions to the discrete Schrödinger equation i...
The problem of the uniqueness in the Cauchy problem is a fundamental problem in a theory of partial ...
AbstractLocal uniqueness of solutions to the Cauchy problem is shown for certain classes of operator...
In this paper, we establish some new L2 − L2 Carleman estimates for the Baouendi–Grushin operators B...
AbstractA study of local strong uniqueness is given. Concepts of local strong uniqueness and directi...
In this paper we consider the non-uniqueness and the uniqueness property for the solutions to the Ca...
Local and global Carleman estimates play a central role in the study of some partial differential eq...
The paper contains a generalization of Calderón's theorem on the local uniqueness of the solutions o...
AbstractCarleman estimates are an indispensable tool for proving uniqueness of continuation for solu...
Não disponívelF. Trèves, in [T2], applied the Concatenation Method and Carleman\'s Method to show u...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1989.Title as it appea...
DOI
Add to ORKG