@Article{hmt.14.3,
AUTHOR = {Mahmoud A. Ismail, Shadia Fathi Mohamed El Sherif 
, A. A. El-Bary, Hamdy M. Youssef},
TITLE = {GENERALIZED MAGNETO- THERMOELASTICITY AND HEAT  CONDUCTION ON AN INFINITE MEDIUM WITH SPHERICAL CAVITY},
JOURNAL = {Frontiers in Heat and Mass Transfer},
VOLUME = {14},
YEAR = {2020},
NUMBER = {1},
PAGES = {1--7},
URL = {http://www.techscience.com/fhmt/v14n1/52923},
ISSN = {2151-8629},
ABSTRACT = {In this paper we will discuss the problem of distribution of thermal stresses and temperature in a generalized magneto–thermo-viscoelastic solid 
spherical cavity of radius R according to Green- Naghdi (G-N II) and (G-N III) theory. The surface of the cavity is assumed to be free traction and 
subjected to a constant thermal shock. The Laplace transform technique is used to solve the problem. The state space approach is adopted for the 
solution of one dimensional problem. Solution of the problem in the physical domain are obtained by using a numerical method of MATLAP
Programmer and the expression for the temperature, strain and stress are obtained. Numerical computations are carried out for a particular material for 
illustrating the results. Finally the results obtained are presented graphically to show the effect of time on the field.},
DOI = {10.5098/hmt.14.3}
}