Email this article Stability of solutions to extremum problems for the nonlinear convection–diffusion–reaction equation with the Dirichlet condition
- Authors: Brizitskii R.V.1,2, Saritskaya Z.Y.2
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Affiliations:
- Institute of Applied Mathematics, Far Eastern Branch
- Far Eastern Federal University
- Issue: Vol 56, No 12 (2016)
- Pages: 2011-2022
- Section: Article
- URL: https://journals.rcsi.science/0965-5425/article/view/178792
- DOI: https://doi.org/10.1134/S096554251612006X
- ID: 178792
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Abstract
The solvability of the boundary value and extremum problems for the convection–diffusion–reaction equation in which the reaction coefficient depends nonlinearly on the concentration of substances is proven. The role of the control in the extremum problem is played by the boundary function in the Dirichlet condition. For a particular reaction coefficient in the extremum problem, the optimality system and estimates of the local stability of its solution to small perturbations of the quality functional and one of specified functions is established.
About the authors
R. V. Brizitskii
Institute of Applied Mathematics, Far Eastern Branch; Far Eastern Federal University
Author for correspondence.
Email: mlnwizard@mail.ru
Russian Federation, Vladivostok, 690041; Vladivostok, 690950
Zh. Yu. Saritskaya
Far Eastern Federal University
Email: mlnwizard@mail.ru
Russian Federation, Vladivostok, 690950
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