
doi: 10.1007/bf00847125
Axisymmetrical problem of thermoelasticity for an elastic half-space with a spheroidal inclusion is considered assuming that the materials of the matrix and the inclusion differ only by coefficient of linear expansion. Stresses in the system appear due to its stationary heating. The general theory of the Newtonian potential in spheroidal coordinates and the integral Hankel transform allow to obtain an accurate solution of the problem by quadratures.
Elastic materials, Newtonian potential, quadratures, axisymmetrical problem, Heat and mass transfer, heat flow, integral Hankel transform, spheroidal coordinates, stationary heating
Elastic materials, Newtonian potential, quadratures, axisymmetrical problem, Heat and mass transfer, heat flow, integral Hankel transform, spheroidal coordinates, stationary heating
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