Optimization analysis of the inverse coefficient problem for the nonlinear convection-diffusion-reaction equation
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Roman V. Brizitskii
und
Zhanna Y. Saritskaya
Abstract
The inverse coefficient problem for the nonlinear convection-diffusion-reaction equation is considered. A velocity vector and a mass-transfer coefficient are considered as the unknown coefficients and are recovered with the help of the additional information about the boundary value problem’s solution. The inverse coefficient problem is reduced to a two-parameter problem of multiplicative control, the solvability of which is proved in a general form. For a cubic reaction coefficient the local stability estimates of the control problem’s solutions are obtained regarding to a rather small perturbation of either the cost functional or the specified functions of the boundary value problem.
Funding source: Russian Foundation for Basic Research
Award Identifier / Grant number: 16-01-00365-a
Funding source: Far East Branch, Russian Academy of Sciences
Award Identifier / Grant number: 18-5-064
Funding statement: The first author was supported by the Federal Agency for Scientific Organizations in framework of the state task (subject no. 0263-2018-0001). The second author was supported by the Russian Foundation for Basic Research (project no. 16-01-00365-a) and by the Fundamental Research Program FEB RAS “Far East” (project no. 18-5-064).
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© 2018 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
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- Under-relaxed quasi-Newton acceleration for an inverse fixed-point problem coming from Positron Emission Tomography
- An adaptive iteration reconstruction method for limited-angle CT image reconstruction
- Accuracy estimates of regularization methods and conditional well-posedness of nonlinear optimization problems
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Artikel in diesem Heft
- Frontmatter
- TGV-based multiplicative noise removal approach: Models and algorithms
- Design criteria for geometrical calibration phantoms in fan and cone beam CT systems
- Under-relaxed quasi-Newton acceleration for an inverse fixed-point problem coming from Positron Emission Tomography
- An adaptive iteration reconstruction method for limited-angle CT image reconstruction
- Accuracy estimates of regularization methods and conditional well-posedness of nonlinear optimization problems
- A non-smooth and non-convex regularization method for limited-angle CT image reconstruction
- Optimization analysis of the inverse coefficient problem for the nonlinear convection-diffusion-reaction equation
- A finite difference method for the very weak solution to a Cauchy problem for an elliptic equation
- A numerical algorithm for constructing an individual mathematical model of HIV dynamics at cellular level
