Elastic medium with plane-parallel borders

Category: 13-4
I.P. Dobrovolsky

 

UDC 550.340

 

  

I.P. Dobrovolsky

 

Schmidt Institute of Physics of the Earth, Russian Academy of Sciences, Moscow, Russia

 

Abstract

The linearly-elastic environment with homogeneous and isotropic layers is considered. It models an earth's crust. To the equations describing such layer, it is possible to apply double transformation Fourier and to receive the common decision. Such procedure has been lead and two problems are analyzed by this method. The first problem is about the concentrated force in the space consisting from two different half-spaces. In the second problem homogeneous half-space is considered on which the elastic layer with other modules lays. The concentrated force is enclosed to a surface of the layer.

Keywords: heterogeneity, Green’s function, double Fourier transformation.

 

References

Dobrovol’sky, I.P., Matematicheskaya teoriya podgotovki i prognoza zemletryasenii (Mathematical Theory of Preparation and Prediction of Earthquakes), Moscow: FIZMATLIT, 2009

Dobrovolskii, I. P., An Inclusion Problem, Mechanics of Solids, 2010, no. 5, pp. 726-732.

Dobrovolskii, I. P., Problem on an inhomogeneity in a linearly elastic space or half-space, Mechanics of Solids, 2007, no. 1, pp. 50-56.

Eshelby, J. Kontinual’naya teoriya dislokatsii (Continuous dislocation theory), Moscow: IL, 1963.

Goldstein, R.V. and Shifrin, E.L., Integral equations of the problem of an elastic inclusion. Complete analytical solution of the problem of an elliptical inclusion, Mechanics of Solids, 2004, vol. 39, no. 1, pp. 36-55.

Goldstein, R.V. and Shifrin, E.L., Stress state in an elastic space due to phase transformations in an inclusion, Mechanics of Solids, 2005, vol. 40, no. 5, pp. 34-47.

Gradshtein, I.S. and Ryzhik, I.M., Tablitsy integralov, summ, ryadov i proizvedenii (Tables of integrals, sums, rows, and muliplications), Moscow: Fizmatgiz, 1962.

Lomakin, V.A., Teoriya uprugosti neodnorodnykh tel (Theory of elasticity of nonuniform bodies), Moscow: MGU, 1976.

Novatskii, V., Teoriya uprugosti (Theory of elasticity), Moscow: Mir, 1975.

Novozhilov, V.N., Teoriya uprugosti (Theory of elasticity), Leningrad: Sudpromgiz, 1958.

Papkovich, P.F., Teoriya uprugosti (Theory of elasticity), Moscow: Oborongiz, 1939.

Sneddon, I.N. and Berry, D.S., The classical theory of elasticity, Berlin-Gettingen-Heidelberg: Springer, 1958.