Theory of heat conduction in a series of nonuniform layers
Abstract
Expressions are obtained for describing the two-dimensional steady-state heat conduction in layers arranged on a curvilinear surface. The Green function is used to solve the boundary value problems of the first kind relative to the temperature and the function of the relevant heat flow. Examples are provided for boundary value problems of the first kind for layers whose heat conductivity is the square of a harmonic function.
- Publication:
-
Inzhenerno Fizicheskii Zhurnal
- Pub Date:
- June 1975
- Bibcode:
- 1975InFiZ..28.1088G
- Keywords:
-
- Anisotropic Media;
- Conductive Heat Transfer;
- Surface Layers;
- Thermal Conductivity;
- Boundary Value Problems;
- Green'S Functions;
- Harmonic Functions;
- Steady State;
- Fluid Mechanics and Heat Transfer