Rheological model of viscoelastic body with memory and differential equations of fractional oscillator
One-dimensional generalized rheologic model of viscoelastic body with Riemann-Liouville derivatives is considered. Instead of derivatives of order α>1 there are employed in defining relations derivatives of order 0<α<1 from integer derivatives. It’s shown, that the differential equation for...
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Samara State Technical University
2011-03-01
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| Series: | Vestnik Samarskogo Gosudarstvennogo Tehničeskogo Universiteta. Seriâ: Fiziko-Matematičeskie Nauki |
| Online Access: | http://mi.mathnet.ru/eng/vsgtu932 |
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doaj-9aff9b7674fa42c3a4865bac73be3a4e2020-11-25T01:36:38ZengSamara State Technical UniversityVestnik Samarskogo Gosudarstvennogo Tehničeskogo Universiteta. Seriâ: Fiziko-Matematičeskie Nauki1991-86152310-70812011-03-011(22)25526810.14498/vsgtu932 Rheological model of viscoelastic body with memory and differential equations of fractional oscillatorN. S. Yashagin V. P. RadchenkoE. N. OgorodnikovOne-dimensional generalized rheologic model of viscoelastic body with Riemann-Liouville derivatives is considered. Instead of derivatives of order α>1 there are employed in defining relations derivatives of order 0<α<1 from integer derivatives. It’s shown, that the differential equation for the deformation with given dependence of the tension from the time with classical initial conditions of Cauchy are reduced to the Volterra integral equations. Some variants of the generalized fractional Voigt’s model are considered. Explicit solutions for corresponding differential equation for the deformation are found out. It’s indicated, that these solutions coincide with the classical ones when the fractional parameter vanishes.http://mi.mathnet.ru/eng/vsgtu932 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
N. S. Yashagin V. P. Radchenko E. N. Ogorodnikov |
| spellingShingle |
N. S. Yashagin V. P. Radchenko E. N. Ogorodnikov Rheological model of viscoelastic body with memory and differential equations of fractional oscillator Vestnik Samarskogo Gosudarstvennogo Tehničeskogo Universiteta. Seriâ: Fiziko-Matematičeskie Nauki |
| author_facet |
N. S. Yashagin V. P. Radchenko E. N. Ogorodnikov |
| author_sort |
N. S. Yashagin |
| title |
Rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| title_short |
Rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| title_full |
Rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| title_fullStr |
Rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| title_full_unstemmed |
Rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| title_sort |
rheological model of viscoelastic body with memory and differential equations of fractional oscillator |
| publisher |
Samara State Technical University |
| series |
Vestnik Samarskogo Gosudarstvennogo Tehničeskogo Universiteta. Seriâ: Fiziko-Matematičeskie Nauki |
| issn |
1991-8615 2310-7081 |
| publishDate |
2011-03-01 |
| description |
One-dimensional generalized rheologic model of viscoelastic body with Riemann-Liouville derivatives is considered. Instead of derivatives of order α>1 there are employed in defining relations derivatives of order 0<α<1 from integer derivatives. It’s shown, that the differential equation for the deformation with given dependence of the tension from the time with classical initial conditions of Cauchy are reduced to the Volterra integral equations. Some variants of the generalized fractional Voigt’s model are considered. Explicit solutions for corresponding differential equation for the deformation are found out. It’s indicated, that these solutions coincide with the classical ones when the fractional parameter vanishes. |
| url |
http://mi.mathnet.ru/eng/vsgtu932 |
| work_keys_str_mv |
AT nsyashagin rheologicalmodelofviscoelasticbodywithmemoryanddifferentialequationsoffractionaloscillator AT vpradchenko rheologicalmodelofviscoelasticbodywithmemoryanddifferentialequationsoffractionaloscillator AT enogorodnikov rheologicalmodelofviscoelasticbodywithmemoryanddifferentialequationsoffractionaloscillator |
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1725061839760392192 |