On the finite element method for the mathematical  fourth order model with nonsmooth coefficients

Golovaneva F.; Meach Mon

doi:doi:10.12737/6738

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On the finite element method for the mathematical fourth order model with nonsmooth coefficients

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ON THE FINITE ELEMENT METHOD FOR THE MATHEMATICAL FOURTH ORDER MODEL WITH NONSMOOTH COEFFICIENTS

Journal: ACTUAL DIRECTIONS OF SCIENTIFIC RESEARCHES OF THE XXI CENTURY: THEORY AND PRACTICE Volume 2 № 5 p. 2 , 2014

Rubrics: SEKCIYA: «KACHESTVENNAYA TEORIYA DINAMICHESKIH SISTEM»

Golovaneva F.

Meach Mon

Author and publication information

Authors:

Type:

Article

DOI:

https://doi.org/10.12737/6738

Pages:

from 24 to 26

Status:

Published

Received:

02.12.2014

Accepted:

02.12.2014

Published:

02.12.2014

Language:

Russian

Keywords:

mathematical model, the finite element method, nonsmooth solutions.

Abstract and keywords

Abstract (English):
In the work of the finite element method covers the mathematical model of the fourth order with nonsmooth solutions.

Keywords:
mathematical model, the finite element method, nonsmooth solutions.

Text

УДК: 517.956.32

О МЕТОДЕ КОНЕЧНЫХ ЭЛЕМЕНТОВ ДЛЯ МАТЕМАТИЧЕСКОЙ МОДЕЛИ ЧЕТВЕРТОГО ПОРЯДКА С НЕГЛАДКИМИ КОЭФФИЦИЕНТАМИ

ON THE FINITE ELEMENT METHOD FOR THE MATHEMATICAL

FOURTH ORDER MODEL WITH NONSMOOTH COEFFICIENTS

Голованева Ф.В., доцент

ФГБОУ ВПО «Воронежский государственный университет»

г. Воронеж, Россия

gfainav@mail.ru

Меач Мон, преподаватель

Университет Khmerak, Пномпеня, Королевство Камбоджа

meach_mon@yahoo.com

DOI: 10.12737/6738

Аннотация: В работе метод конечных элементов распространяется на математическое модели четвертого порядка с негладкими решениями.

Summary: In the work of the finite element method covers the mathematical model of the fourth order with nonsmooth solutions.

Ключевые слова: математическая модель, метод конечных элементов, негладкие решения.

Keywords: mathematical model, the finite element method, nonsmooth solutions.

References

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2. Shabrov S.A. o kraevykh zadachakh s impul´snymi koeffitsientami / S.A. Shabrov. avtoreferat dissertatsii na soiskanie uchenoy stepeni kandidata fiziko-matematicheskikh nauk. - Voronezh, 2000. - 11 c.

3. Pokornyy, Yu.V. ostsillyatsionnaya teoriya Shturma-liuvillya dlya impul´snykh zadach / Yu.V. Pokornyy, M.B. Zvereva, S.A. Shabrov. Uspekhi matematicheskikh nauk. - 2008. - T. 63. № 1. - S. 111-154.

4. Zvereva, M.B. O nekotorykh voprosakh kachestvennoy teorii differentsial´nykh uravneniy s proizvodnymi Stilt´esa / M.B. Zvereva. dissertatsiya na soiskanie uchenoy stepeni kandidata fiziko-matematicheskikh nauk. Voronezhskiy gosudarstvennyy universitet. Voronezh, 2005. - 120 s.

5. Shabrov, S.A. Ob odnoy matematicheskoy modeli malykh deformatsiy sterzhnevoy sistemy s vnutrennimi osobennostyami / S.A. Shabrov. Vestnik Voronezhskogo gosudarstvennogo universiteta. Seriya: Fizika. Matematika. - 2013. - № 1. - S. 232-250.

6. An Irregular Extension of the Oscillation Theory of the Sturm-Liouville Spectral Problem / Yu.V. Pokornyi, M.B. Zvereva, S.A. Shabrov, A.S. Ishchenko. Mathematical Notes. - 2007. - T. 82, № 3-4. - S. 518-521.

7. Zvereva, M.B. ob adaptatsii metoda konechnykh elementov dlya resheniya granichnoy zadachi s differentsialami Stilt´esa na geometricheskom grafe / M.B. Zvereva, S.A. Shabrov, E.V. Lylov. Vestnik Voronezhskogo gosudarstvennogo universiteta. Seriya: Fizika. Matematika. - 2014. - № 1. - S. 97-105.

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