Representation of solutions of dynamics problems of highly intensive heat transfer
Abstract
The dynamics of high-intensity heat exchange is examined. A Laplace transform method is applied with boundary conditions of the first through third kinds to obtain solutions to the hyperbolic heat conductivity equations. The complex integrals of these solutions are represented by a class of special functions (Korol'kov, 1976) which has been widely studied.
- Publication:
-
Inzhenerno Fizicheskii Zhurnal
- Pub Date:
- July 1979
- Bibcode:
- 1979InFiZ..37..157K
- Keywords:
-
- Conductive Heat Transfer;
- Hyperbolic Differential Equations;
- Laser Heating;
- Nonequilibrium Thermodynamics;
- Pulse Heating;
- Bessel Functions;
- Heat Flux;
- Laplace Transformation;
- Mass Transfer;
- Tables (Data);
- Thermal Diffusivity;
- Fluid Mechanics and Heat Transfer