Carleman estimates for anisotropic elliptic operators with jumps at an interface

Jérôme Le Rousseau; Nicolas Lerner

Journal ArticleOPEN ACCESS

Carleman estimates for anisotropic elliptic operators with jumps at an interface

Analysis and PDE (2013) 6(7) 1601-1648

DOI: 10.2140/apde.2013.6.1601

20Citations

5Readers

Abstract

We consider a second-order self-adjoint elliptic operator with an anisotropic diffusion matrix having a jump across a smooth hypersurface. We prove the existence of a weight function such that a Carleman estimate holds true. We also prove that the conditions imposed on the weight function are sharp. © 2013 Mathematical Sciences Publishers.

Author supplied keywords

References Powered by Scopus

View more at Scopus

Cited by Powered by Scopus

View more at Scopus

Cite

CITATION STYLE

APA

Rousseau, J. L., & Lerner, N. (2013). Carleman estimates for anisotropic elliptic operators with jumps at an interface. Analysis and PDE, 6(7), 1601–1648. https://doi.org/10.2140/apde.2013.6.1601

Readers over time

Readers' Seniority

PhD / Post grad / Masters / Doc 2

50%

Researcher 2

50%

Readers' Discipline

Mathematics 4

100%

Carleman estimates for anisotropic elliptic operators with jumps at an interface

Abstract

Author supplied keywords

References Powered by Scopus

Sharp sufficient conditions for the observation, control, and stabilization of waves from the boundary

Contrôle exact de l'équation de la chaleur

Null and approximate controllability for weakly blowing up semilinear heat equations

Cited by Powered by Scopus

Carleman estimates for elliptic operators with complex coefficients. Part I: Boundary value problems

Carleman estimate for second order elliptic equations with Lipschitz leading coefficients and jumps at an interface

Spectral inequality and resolvent estimate for the bi-Laplace operator

Register to see more suggestions

Cite

Readers over time

Readers' Seniority

Readers' Discipline