Axisymmetric solutions to time-fractional heat conduction equation in a half-space under Robin boundary conditions (Q446331): Difference between revisions
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| Property / author: Y. Z. Povstenko / rank | |||
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Summary: The time-fractional heat conduction equation with the Caputo derivative of the order \(0 < \alpha < 2\) is considered in a half-space in axisymmetric case under two types of Robin boundary condition: the mathematical one with the prescribed linear combination of the values of temperature and the values of its normal derivative and the physical condition with the prescribed linear combination of the values of temperature and the values of the heat flux at the boundary. | |||
| Property / review text: Summary: The time-fractional heat conduction equation with the Caputo derivative of the order \(0 < \alpha < 2\) is considered in a half-space in axisymmetric case under two types of Robin boundary condition: the mathematical one with the prescribed linear combination of the values of temperature and the values of its normal derivative and the physical condition with the prescribed linear combination of the values of temperature and the values of the heat flux at the boundary. / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 35R11 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 35K05 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 35B07 / rank | |||
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| Property / zbMATH DE Number | |||
| Property / zbMATH DE Number: 6078077 / rank | |||
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Revision as of 09:08, 30 June 2023
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| English | Axisymmetric solutions to time-fractional heat conduction equation in a half-space under Robin boundary conditions |
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Axisymmetric solutions to time-fractional heat conduction equation in a half-space under Robin boundary conditions (English)
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6 September 2012
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Summary: The time-fractional heat conduction equation with the Caputo derivative of the order \(0 < \alpha < 2\) is considered in a half-space in axisymmetric case under two types of Robin boundary condition: the mathematical one with the prescribed linear combination of the values of temperature and the values of its normal derivative and the physical condition with the prescribed linear combination of the values of temperature and the values of the heat flux at the boundary.
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