A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept
In this work, we investigate a linear completely nonhomogeneous nonlocal multipoint problem for an m-order ordinary differential equation with generally variable nonsmooth coefficients satisfying some general properties such as p-integrability and boundedness. A system of m + 1 integro-algebraic eq...
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Vilnius Gediminas Technical University
2012-09-01
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| Series: | Mathematical Modelling and Analysis |
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| Online Access: | https://journals.vgtu.lt/index.php/MMA/article/view/4895 |
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doaj-3ba15e3647c94cae88a49f8077b3bbf62021-07-02T11:23:02ZengVilnius Gediminas Technical UniversityMathematical Modelling and Analysis1392-62921648-35102012-09-0117410.3846/13926292.2012.709471A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional conceptKemal Ozen0Kamil Orucoglu1Istanbul Technical University Department of Mathematics, 34469 Maslak, Istanbul, Turkey; Namk Kemal University Department of Mathematics, 59030 Tekirdag, TurkeyIstanbul Technical University Department of Mathematics, 34469 Maslak, Istanbul, Turkey In this work, we investigate a linear completely nonhomogeneous nonlocal multipoint problem for an m-order ordinary differential equation with generally variable nonsmooth coefficients satisfying some general properties such as p-integrability and boundedness. A system of m + 1 integro-algebraic equations called the special adjoint system is constructed for this problem. Green's functional is a solution of this special adjoint system. Its first component corresponds to Green's function for the problem. The other components correspond to the unit effects of the conditions. A solution to the problem is an integral representation which is based on using this new Green's functional. Some illustrative implementations and comparisons are provided with some known results in order to demonstrate the advantages of the proposed approach. https://journals.vgtu.lt/index.php/MMA/article/view/4895Green's functionnonlocal boundary conditionnonlocal integral conditionboundary value problemadjoint problem |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Kemal Ozen Kamil Orucoglu |
| spellingShingle |
Kemal Ozen Kamil Orucoglu A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept Mathematical Modelling and Analysis Green's function nonlocal boundary condition nonlocal integral condition boundary value problem adjoint problem |
| author_facet |
Kemal Ozen Kamil Orucoglu |
| author_sort |
Kemal Ozen |
| title |
A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| title_short |
A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| title_full |
A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| title_fullStr |
A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| title_full_unstemmed |
A representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| title_sort |
representative solution to m-order linear ordinary differential equation with nonlocal conditions by green's functional concept |
| publisher |
Vilnius Gediminas Technical University |
| series |
Mathematical Modelling and Analysis |
| issn |
1392-6292 1648-3510 |
| publishDate |
2012-09-01 |
| description |
In this work, we investigate a linear completely nonhomogeneous nonlocal multipoint problem for an m-order ordinary differential equation with generally variable nonsmooth coefficients satisfying some general properties such as p-integrability and boundedness. A system of m + 1 integro-algebraic equations called the special adjoint system is constructed for this problem. Green's functional is a solution of this special adjoint system. Its first component corresponds to Green's function for the problem. The other components correspond to the unit effects of the conditions. A solution to the problem is an integral representation which is based on using this new Green's functional. Some illustrative implementations and comparisons are provided with some known results in order to demonstrate the advantages of the proposed approach.
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| topic |
Green's function nonlocal boundary condition nonlocal integral condition boundary value problem adjoint problem |
| url |
https://journals.vgtu.lt/index.php/MMA/article/view/4895 |
| work_keys_str_mv |
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