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Weak global solvability of the two phase problem for a class of parabolic systems with strong nonlinearity in the gradient. The case of two spatial variables. / Arkhipova, A.A.
в: АЛГЕБРА И АНАЛИЗ, Том 31, № 2, 03.2019, стр. 118-151.Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
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TY - JOUR
T1 - Weak global solvability of the two phase problem for a class of parabolic systems with strong nonlinearity in the gradient. The case of two spatial variables
AU - Arkhipova, A.A.
N1 - A. A. Arkhipova, “Weak global solvability of the two-phase problem for a class of parabolic systems with strong nonlinearity in the gradient. The case of two spatial variables”, Алгебра и анализ, 31:2 (2019), 118–151
PY - 2019/3
Y1 - 2019/3
N2 - A class of quasilinear parabolic systems with nondiagonal principal matrix and strongly nonlinear additional terms is considered. The elliptic operator of the system has a variational structure and is generated by a quadratic functional with a nondiagonal matrix. A plane domain of the spatial variables is divided by a smooth curve in two subdomains and the principal matrix of the system has a “jump” crossing this curve. The two-phase conditions are given on this curve and the Cauchy–Dirihlet conditions hold at the parabolic boundary of the main parabolic cylinder. The existence of a weak Hölder continuous global solution of the two-phase problem is proved. The problem can be regarded as a construction of the heat flow from a given vector-function to an extremal of the functional.
AB - A class of quasilinear parabolic systems with nondiagonal principal matrix and strongly nonlinear additional terms is considered. The elliptic operator of the system has a variational structure and is generated by a quadratic functional with a nondiagonal matrix. A plane domain of the spatial variables is divided by a smooth curve in two subdomains and the principal matrix of the system has a “jump” crossing this curve. The two-phase conditions are given on this curve and the Cauchy–Dirihlet conditions hold at the parabolic boundary of the main parabolic cylinder. The existence of a weak Hölder continuous global solution of the two-phase problem is proved. The problem can be regarded as a construction of the heat flow from a given vector-function to an extremal of the functional.
KW - системы уравнений, параболичность
KW - Parabolic systems
KW - strong nonlinearity
KW - global solvability
UR - http://www.mathnet.ru/php/archive.phtml?wshow=paper&jrnid=aa&paperid=1640&option_lang=rus
UR - https://elibrary.ru/item.asp?id=37078093
M3 - Article
VL - 31
SP - 118
EP - 151
JO - АЛГЕБРА И АНАЛИЗ
JF - АЛГЕБРА И АНАЛИЗ
SN - 0234-0852
IS - 2
ER -
ID: 39997922