Mixed‐Matrix Membranes

In this work we study the semi-discrete linearized Benjamin-Bona-Mahony equation (BBM) which is a model for propagation of one-dimensional, unidirectional, small amplitude long waves in non-linear dispersive media. In particular, we derive a stability estimate which yields a unique continuation property. The proof is based on a Carleman estimate for a finite difference approximation of Laplace operator with boundary observation in which the large parameter is connected to the mesh size.

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Discrete Calderón problem with partial data

Lecaros¹,

Ortega²,

Pérez³

et al. 2023

Inverse Problems

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In this work, we are interested in analyzing the well-known Calderón problem, which is an inverse boundary value problem of determining a coefficient function of an elliptic partial differential equation from the knowledge of the associated Dirichlet-to-Neumann map on the boundary of a domain. We consider the discrete version of the Calderon inverse problem with partial boundary data; in particular, we establish logarithmic stability estimates for the discrete Calderón problem, in dimension $d\geq 3$, for the discrete $H^{-r}$-norm on the boundary under suitable a priori bounds. The proof of our main result is based on a new discrete Carleman estimate for the discrete Laplacian operator with boundary observations.

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Discrete Carleman estimates and application to controllability for a fully-discrete parabolic operator with dynamic boundary conditions

Lecaros

Morales

Pérez

et al. 2023

Journal of Differential Equations

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Ariel Pérez

Carleman estimates and controllability for a semi-discrete fourth-order parabolic equation

Stability estimate for the semi-discrete linearized Benjamin-Bona-Mahony equation

Discrete Calderón problem with partial data

Discrete Carleman estimates and application to controllability for a fully-discrete parabolic operator with dynamic boundary conditions

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