Analytical solutions of a particular Hill's differential system
Consider a second order differential linear periodic equation. This equation is recast as a first-order homogeneous Hill’s system. For this system we obtain analytical solutions in explicit form. The first solution is a periodic function. The second solution is a sum of two functions; the first is a...
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National Institute for Aerospace Research “Elie Carafoli” - INCAS
2019-03-01
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| Online Access: | http://bulletin.incas.ro/files/marcov__vol_11_iss_1.pdf |
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doaj-eadb3b90bb38461d800a8923901eefde2020-11-25T00:24:20ZengNational Institute for Aerospace Research “Elie Carafoli” - INCASINCAS Bulletin2066-82012247-45282019-03-0111112112910.13111/2066-8201.2019.11.1.9Analytical solutions of a particular Hill's differential systemNicolae MARCOV0University of Bucharest, Faculty of Mathematics and Computer Science, Str. Academiei nr. 14, sector 1, 0101014, Bucharest, Romania, nmarcov@fmi.unibuc.roConsider a second order differential linear periodic equation. This equation is recast as a first-order homogeneous Hill’s system. For this system we obtain analytical solutions in explicit form. The first solution is a periodic function. The second solution is a sum of two functions; the first is a continuous periodic function, but the second is an oscillating function with monotone linear increasing amplitude. We give a formula to directly compute the slope of this increase, without knowing the second numerical solution. The periodic term of second solution may be computed directly. The coefficients of fundamental matrix of the system are analytical functions. http://bulletin.incas.ro/files/marcov__vol_11_iss_1.pdflinear differential equationdynamic systemparametric resonance |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Nicolae MARCOV |
| spellingShingle |
Nicolae MARCOV Analytical solutions of a particular Hill's differential system INCAS Bulletin linear differential equation dynamic system parametric resonance |
| author_facet |
Nicolae MARCOV |
| author_sort |
Nicolae MARCOV |
| title |
Analytical solutions of a particular Hill's differential system |
| title_short |
Analytical solutions of a particular Hill's differential system |
| title_full |
Analytical solutions of a particular Hill's differential system |
| title_fullStr |
Analytical solutions of a particular Hill's differential system |
| title_full_unstemmed |
Analytical solutions of a particular Hill's differential system |
| title_sort |
analytical solutions of a particular hill's differential system |
| publisher |
National Institute for Aerospace Research “Elie Carafoli” - INCAS |
| series |
INCAS Bulletin |
| issn |
2066-8201 2247-4528 |
| publishDate |
2019-03-01 |
| description |
Consider a second order differential linear periodic equation. This equation is recast as a first-order homogeneous Hill’s system. For this system we obtain analytical solutions in explicit form. The first solution is a periodic function. The second solution is a sum of two functions; the first is a continuous periodic function, but the second is an oscillating function with monotone linear increasing amplitude. We give a formula to directly compute the slope of this increase, without knowing the second numerical solution. The periodic term of second solution may be computed directly. The coefficients of fundamental matrix of the system are analytical functions.
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| topic |
linear differential equation dynamic system parametric resonance |
| url |
http://bulletin.incas.ro/files/marcov__vol_11_iss_1.pdf |
| work_keys_str_mv |
AT nicolaemarcov analyticalsolutionsofaparticularhillsdifferentialsystem |
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1725352585067495424 |