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Study and solution of identification problems for nonstationary 2D and 3D convection–diffusion equations
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V. I. Agoshkov
Published/Copyright:
2005
In this paper we consider two nonstationary heat convection–diffusion models. The first model describes convection–diffusion processes in the 'surface' ocean layer. The second one is a 3D model and describes heat propagation processes in the whole ocean. We pose identification problems for the models and propose methods for solving the problems posed. In the case of the 2D model, the methods of its solution are theoretically justified.
Experimental results using real data for the water area of the Indian Ocean are given.
Published Online: --
Published in Print: 2005-02-01
Copyright 2005, Walter de Gruyter
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- Study and solution of identification problems for nonstationary 2D and 3D convection–diffusion equations
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Articles in the same Issue
- Inverse problems of the mathematical theory of tides: boundary-function problem
- Study and solution of identification problems for nonstationary 2D and 3D convection–diffusion equations
- Identification of the initial function for nonlinear delay differential equations
- Solvability of a tide dynamics model in adjacent seas
- Variational data assimilation for a nonstationary heat conduction problem with nonlinear diffusion
- Mathematical model of sea dynamics in a σ-coordinate system
