The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System
Investigations of initial boundary value problems for parabolic equations solutions are an important component of mathematical modeling. In this regard of special interest for mathematical modeling are the boundary value problem solutions that undergo sharp changes in any area of space. Such areas a...
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| Format: | Article |
| Language: | English |
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Yaroslavl State University
2016-06-01
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| Series: | Моделирование и анализ информационных систем |
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| Online Access: | https://www.mais-journal.ru/jour/article/view/345 |
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| author | N. T. Levashova A. A. Melnikova S. V. Bytsyura |
| author_facet | N. T. Levashova A. A. Melnikova S. V. Bytsyura |
| author_sort | N. T. Levashova |
| collection | DOAJ |
| description | Investigations of initial boundary value problems for parabolic equations solutions are an important component of mathematical modeling. In this regard of special interest for mathematical modeling are the boundary value problem solutions that undergo sharp changes in any area of space. Such areas are called internal transitional layers. In case when the position of a transitional layer changes over time, the solution of a parabolic equation behaves as a moving front. For the purpose of proving the existence of such initial boundary value problem solutions, the method of differential inequalities is very effective. According to this method the so-called upper and lower solutions are to be constructed for the initial boundary value problem. The essence of an asymptotic method of differential inequalities is in receiving the upper and lower solutions as modifications of asymptotic submissions of the solutions of boundary value problems. The existence of the upper and lower solutions is a sufficient condition of existence of a solution of a boundary value problem. While proving the differential inequalities the so-called ”quasimonotony” condition is essential. In the present work it is considered how to construct the upper and lower solutions for the system of the parabolic equations under various conditions of quasimonotony. |
| format | Article |
| id | doaj-art-93cc2baea91d4e4cb4ce951f664ad645 |
| institution | DOAJ |
| issn | 1818-1015 2313-5417 |
| language | English |
| publishDate | 2016-06-01 |
| publisher | Yaroslavl State University |
| record_format | Article |
| series | Моделирование и анализ информационных систем |
| spelling | doaj-art-93cc2baea91d4e4cb4ce951f664ad6452025-08-20T03:01:13ZengYaroslavl State UniversityМоделирование и анализ информационных систем1818-10152313-54172016-06-0123331732510.18255/1818-1015-2016-3-317-325302The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations SystemN. T. Levashova0A. A. Melnikova1S. V. Bytsyura2Lomonosov Moscow State UniversityLomonosov Moscow State UniversityLomonosov Moscow State UniversityInvestigations of initial boundary value problems for parabolic equations solutions are an important component of mathematical modeling. In this regard of special interest for mathematical modeling are the boundary value problem solutions that undergo sharp changes in any area of space. Such areas are called internal transitional layers. In case when the position of a transitional layer changes over time, the solution of a parabolic equation behaves as a moving front. For the purpose of proving the existence of such initial boundary value problem solutions, the method of differential inequalities is very effective. According to this method the so-called upper and lower solutions are to be constructed for the initial boundary value problem. The essence of an asymptotic method of differential inequalities is in receiving the upper and lower solutions as modifications of asymptotic submissions of the solutions of boundary value problems. The existence of the upper and lower solutions is a sufficient condition of existence of a solution of a boundary value problem. While proving the differential inequalities the so-called ”quasimonotony” condition is essential. In the present work it is considered how to construct the upper and lower solutions for the system of the parabolic equations under various conditions of quasimonotony.https://www.mais-journal.ru/jour/article/view/345parabolic equations systeminternal transitional layerdifferential inequalities method |
| spellingShingle | N. T. Levashova A. A. Melnikova S. V. Bytsyura The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System Моделирование и анализ информационных систем parabolic equations system internal transitional layer differential inequalities method |
| title | The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System |
| title_full | The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System |
| title_fullStr | The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System |
| title_full_unstemmed | The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System |
| title_short | The Application of the Differential Inequalities Method for Proving the Existence of Moving Front Solution of the Parabolic Equations System |
| title_sort | application of the differential inequalities method for proving the existence of moving front solution of the parabolic equations system |
| topic | parabolic equations system internal transitional layer differential inequalities method |
| url | https://www.mais-journal.ru/jour/article/view/345 |
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