Solution of Hyperbolic Heat-Conduction Equation with Relaxation Time of High-Speed Thermal Wave
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概要
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A hyperbolic heat-conduction equation is solved for a solid of finite length at low temperatures using the Laplace transformation with the Fourier series under thermal insulation. As a result, the solution expressed with respect to both relaxation time of a high-speed thermal wave and thermal diffusivity of the solid is compared with that derived from a conventional parabolic heat-conduction equation at high temperatures.
- 社団法人応用物理学会の論文
- 1994-03-15
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