**Chapter 3**

**References**

103-110

Nauka; 1984. p. 232

**12**(12):36-48

[1] Biot MA. Theory of propagation of elastic waves in a fluid-saturated porous solid. 1. Low frequency range. The Journal of the Acoustical Society of America. 1956;**28**(2):168-178

*Mathematical Theorems - Boundary Value Problems and Approximations*

[11] Alexeyeva LA, Kurmanov EB. Fundamental and generalized solutions of the two-component medium M. Bio 1. The Fourier transform of fundamental solutions and their regularization. Mathematical Journal. 2017;**17**(2):13-30

[12] Alexeyeva LA, Kurmanov EB. Fourier transform of fundamental solutions for the motion equations of two-component Biot's media. AIP Conference Proceedings. 2017;**1880**:1.

DOI: 10.1063/1.5000675

[2] Biot MA. Theory of propagation of elastic waves in a fluid-saturated porous solid. 2. Higher frequency range. The Journal of the Acoustical Society of America. 1956;**28**(2):178-191

[3] Biot MA. Mechanics of deformation and propagation of acoustic waves in a porous medium. Mechanics. 1963;**6**(28):

[4] Nikolayevsky VN. Mechanics of Porous and Fractured Media. Moscow:

[5] Horoshun LP. To the theory of saturated porous media. International Journal of Applied Mechanics. 1976;

[6] Rakhmatullin KA, Saatov YU, Filippov IG, Artykov TU. Waves in Two-Component Media. Tashkent:

[7] Saatov YU. Plane Problems of Mechanics of Elastic-Porous Media. Tashkent: Nauka UzSSR; 1972. p. 248

[8] Yerzhanov ZS, Aitaliev SM, Alexeyeva LA. Dynamics of Tunnels and Underground Pipelines. Alma-Ata:

Nauka KazSSR; 1989. p. 240

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[9] Alexeyeva LA, Shershnev VV. Fundamental solutions of the equations of motion equation of Biot are medium. In: Reports of National Academy of Sciences of Rep. Kazakhstan. Vol. 1.

[10] Vladimirov VS. Generalized Functions in Mathematical Physics.

Moscow: Mir; 1978. p. 282

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