An inverse problem of finding a time-dependent parameter in a bilinear heat equation
-
Redouane El Mezegueldy
,
Youssef Ouakrim
und
Mohamed Ouzahra
Abstract
This paper investigates the inverse problem of estimating an unknown bilinear control u, applied locally in a reaction-diffusion equation. Our goal is to achieve a temperature profile close to a desired reference at the final time. We formulate the problem as an optimal control framework and analyze the existence, optimality conditions and stability of the solution with respect to the data. An algorithm and some numerical experiments are proposed to show the effectiveness of our approach in steering the system towards a desired state.
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© 2025 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Frontmatter
- An inverse problem of finding a time-dependent parameter in a bilinear heat equation
- A novel method for computing core-EP inverse through elementary transformation
- Convergence rates for Tikhonov regularization of a coefficient identification problem
- Carleman estimate for stochastic degenerate wave equation with drift and its application
- Inverse initial problem under Nash strategy for stochastic reaction-diffusion equations with dynamic boundary conditions
- Understanding edge artifacts of the OSEM algorithm in emission tomography
- Unique reconstruction of the inverse spectral problem with mixed data for AKNS operator
- An inverse problem for nonlinear electrodynamic equations
Artikel in diesem Heft
- Frontmatter
- An inverse problem of finding a time-dependent parameter in a bilinear heat equation
- A novel method for computing core-EP inverse through elementary transformation
- Convergence rates for Tikhonov regularization of a coefficient identification problem
- Carleman estimate for stochastic degenerate wave equation with drift and its application
- Inverse initial problem under Nash strategy for stochastic reaction-diffusion equations with dynamic boundary conditions
- Understanding edge artifacts of the OSEM algorithm in emission tomography
- Unique reconstruction of the inverse spectral problem with mixed data for AKNS operator
- An inverse problem for nonlinear electrodynamic equations
