Temperature distribution in a bimaterial body with a line of cracks under uniform heat flow
Abstract
The temperature distribution in a bimaterial body with a line of cracks at the interface under uniform heat flow is solved. The boundary value problem is reduced to the solution of a singular integral equation of Cauchy type whose solution is given by Muskhelishvili. Temperature distributions for the case of a single crack, and for the case of two collinear cracks are given.
 Publication:

Journal of Engineering Mathematics
 Pub Date:
 August 1992
 DOI:
 10.1007/BF00042740
 Bibcode:
 1992JEnMa..26..363C
 Keywords:

 Binary Systems (Materials);
 Crack Geometry;
 Heat Flux;
 Interface Stability;
 Temperature Distribution;
 Fourier Transformation;
 Numerical Integration;
 Thermal Stresses;
 Structural Mechanics;
 Mathematical Modeling;
 Integral Equation;
 Temperature Distribution;
 Heat Flow;
 Industrial Mathematic