On Solutions of Boundary Value Problem for Fourth-Order Beam Equations
In this paper, we consider the fourth-order linear differential equation u(4) +f(x)u = g(x) subject to the mixed boundary conditions u(0) = u(1) = u‘‘(0) = u‘‘(1) = 0. We first establish sufficient conditions on f(x) that guarantee a unique solution of this problem in the Hilbert space by using an...
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Vilnius Gediminas Technical University
2016-05-01
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| Series: | Mathematical Modelling and Analysis |
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| Online Access: | https://journals.vgtu.lt/index.php/MMA/article/view/815 |
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doaj-0a5618fe72e84f1faf50e1569fda731c2021-07-02T11:45:55ZengVilnius Gediminas Technical UniversityMathematical Modelling and Analysis1392-62921648-35102016-05-0121310.3846/13926292.2016.1155507On Solutions of Boundary Value Problem for Fourth-Order Beam EquationsLazhar Bougoffa0Randolph Rach1Abdul-Majid Wazwaz2Al Imam Mohammad Ibn Saud Islamic University (IMSIU) Faculty of Science, Department of Mathematics, P.O. Box 90950, 11623 Riyadh, Saudi ArabiaThe George Adomian Center for Applied Mathematics 316 South Maple Street, 49057-1225 Hartford, MI, USADepartment of Mathematics, Saint Xavier University Chicago, 60655 IL, USA In this paper, we consider the fourth-order linear differential equation u(4) +f(x)u = g(x) subject to the mixed boundary conditions u(0) = u(1) = u‘‘(0) = u‘‘(1) = 0. We first establish sufficient conditions on f(x) that guarantee a unique solution of this problem in the Hilbert space by using an a priori estimate. Accurate analytic solutions in series forms are obtained by a new variation of the Duan-Rach modified Adomian decomposition method (DRMA), and then extend this approach to some boundary value problems of fourth-order nonlinear beam equations. Also, a comparison of the two approximate solutions by the ADM with the Green function approach is presented. https://journals.vgtu.lt/index.php/MMA/article/view/815fourth-order equationa priori estimateDuan-Rach modified Adomian decomposition methodAdomian polynomials |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Lazhar Bougoffa Randolph Rach Abdul-Majid Wazwaz |
| spellingShingle |
Lazhar Bougoffa Randolph Rach Abdul-Majid Wazwaz On Solutions of Boundary Value Problem for Fourth-Order Beam Equations Mathematical Modelling and Analysis fourth-order equation a priori estimate Duan-Rach modified Adomian decomposition method Adomian polynomials |
| author_facet |
Lazhar Bougoffa Randolph Rach Abdul-Majid Wazwaz |
| author_sort |
Lazhar Bougoffa |
| title |
On Solutions of Boundary Value Problem for Fourth-Order Beam Equations |
| title_short |
On Solutions of Boundary Value Problem for Fourth-Order Beam Equations |
| title_full |
On Solutions of Boundary Value Problem for Fourth-Order Beam Equations |
| title_fullStr |
On Solutions of Boundary Value Problem for Fourth-Order Beam Equations |
| title_full_unstemmed |
On Solutions of Boundary Value Problem for Fourth-Order Beam Equations |
| title_sort |
on solutions of boundary value problem for fourth-order beam equations |
| publisher |
Vilnius Gediminas Technical University |
| series |
Mathematical Modelling and Analysis |
| issn |
1392-6292 1648-3510 |
| publishDate |
2016-05-01 |
| description |
In this paper, we consider the fourth-order linear differential equation u(4) +f(x)u = g(x) subject to the mixed boundary conditions u(0) = u(1) = u‘‘(0) = u‘‘(1) = 0. We first establish sufficient conditions on f(x) that guarantee a unique solution of this problem in the Hilbert space by using an a priori estimate. Accurate analytic solutions in series forms are obtained by a new variation of the Duan-Rach modified Adomian decomposition method (DRMA), and then extend this approach to some boundary value problems of fourth-order nonlinear beam equations. Also, a comparison of the two approximate solutions by the ADM with the Green function approach is presented.
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| topic |
fourth-order equation a priori estimate Duan-Rach modified Adomian decomposition method Adomian polynomials |
| url |
https://journals.vgtu.lt/index.php/MMA/article/view/815 |
| work_keys_str_mv |
AT lazharbougoffa onsolutionsofboundaryvalueproblemforfourthorderbeamequations AT randolphrach onsolutionsofboundaryvalueproblemforfourthorderbeamequations AT abdulmajidwazwaz onsolutionsofboundaryvalueproblemforfourthorderbeamequations |
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1721330719460950016 |