Abstract: In
this paper, an attempt has been made to solve three inverse problems of
thermoelasticity.
In
the first problem, an attempt has been made to determine the unknown
temperature, displacement and stress functions on the upper plane surface in the
finite isotropic hollow cylinder of length h
occupying the space by applying finite Hankel Transform
technique.
The
heat flux for a fixed value of x, is a known function of r
and the temperature is maintained at zero on the curved surfaces and at
lower plane surface, it is maintained at which is a known function of r.
Keywords and phrases: cylinder, inverse problem, outer and upper surfaces unknown, Hankel transform, Marchi-Fasulo and Laplace transform.
