BOUNDARY VALUE PROBLEM FOR NONLINEAR MASS-TRANSFER EQUATIONS UNDER DIRICHLET CONDITION

被引：8

作者：

Saritskaia, Zhanna Yurievna ^{[1
]}

机构：

[1] Inst Appl Math FEB RAS, 7 Radio Str, Vladivostok 690041, Russia

来源：

SIBERIAN ELECTRONIC MATHEMATICAL REPORTS-SIBIRSKIE ELEKTRONNYE MATEMATICHESKIE IZVESTIYA | 2022年 / 19卷 / 01期

关键词：

nonlinear mass-transfer model; generalized Boussinesq model; reaction coefficient; global solvability; maximum principle; UNSTEADY EQUATIONS; EXTREMAL PROBLEMS; CONVECTION; DIFFUSION; HEAT; COEFFICIENT; SOLUBILITY; DESIGN;

D O I：

10.33048/semi.2022.19.031

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Global solvability of a boundary value problem for nonlinear mass-transfer equations under innhomogeneous Dirichlet condition for substance's concentration is proved. For a velocity vector we use a homogeneous Dirichlet condition. The model under consideration generalizes the Boussinesq approximation since the reaction coefficient depends nonlinearly on substance's concentration and depends on spatial variables. Sufficient conditions were established for initial data of boundary value problem under which its solution is unique and also there were determined the conditions under which the maximum principle for substance's concentration is valid.

引用

页码：360 / 370

页数：11

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