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Solution of the dynamic problem of elasticity theory in curvilinear coordinates

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Strength of Materials Aims and scope

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Literature Cited

  1. A. Lyav, Mathematical Theory of Elasticity [in Russian], ONTI, Moscow-Leningrad (1935).

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  2. A. N. Guz' and V. T. Golovchan, Diffraction of Elastic Waves in Multiply Connected Bodies [in Russian], Naukova Dumka, Kiev (1972).

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  3. Herman, Applied Mechanics [Russian translation], Ser. E, No. 3 (1970).

  4. L. I. Fridman, Probl. Prochnosti, No. 11 (1973).

  5. Shakh, Ramkrishnan, and Datta, Applied Mechanics, Ser. E, No. 3 (1969).

  6. A. N. Krylov, Some Differential Equations of Mathematical Physics [in Russian], GITTL, Moscow-Leningrad (1950).

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  7. Lewis Wheeler, J. Ac. Soc. Amer.,53, No. 2 (1973).

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Authors
  1. L. I. Fridman
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Additional information

Kuibyshev. Translated from Problemy Prochnosti, No. 5, pp. 56–61, May, 1976.

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Fridman, L.I. Solution of the dynamic problem of elasticity theory in curvilinear coordinates. Strength Mater 8, 560–566 (1976). https://doi.org/10.1007/BF01528614

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  • DOI: https://doi.org/10.1007/BF01528614

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