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Numerical solution of contact problems of elasticity theory

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Literature Cited

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    P. Benerji and R. Butterfield, Methods of Boundary Elements in Applied Sciences [Russian translation], Mir, Moscow (1984).

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    B. N. Kirkach, Solution of Applied Contact Problems of Thermoelasticity by the Finite Element Method [in Russian], Author's Abstract, Candidate's Disertation, Khar'kov (1983).

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    A. N. Podgornyi and G. L. Khavin, “Taking account of friction in solving contact problems by the method of boundary integral equation,” Dokl. Akad. Nauk UkrSSR, Ser. A. Fiz.-Mat. Tekh. Nauk., No. 1, 31–34 (1986).

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    G. L. Khavin, Substructure approach to the analysis of contact interaction of elastic bodies by the method of boundary integral equations, Dep. in VINITI, No. 5811-84, (Aug. 13, 1984).

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    G. L. Khavin, “Taking account of discontinuity in the stress vector in the method of boundary integral equations,” Din. Sploshn. Mashin.,41, 19–24 (1985).

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Additional information

Institute of Machine Construction Problems, Academy of Sciences of the Ukrainian SSR, Khar'kov. Translated from Prikladnaya Mekhanika, Vol. 23, No. 3, pp. 9–14, March 1987.

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Podgornyi, A.N., Khavin, G.L. Numerical solution of contact problems of elasticity theory. Soviet Applied Mechanics 23, 212–217 (1987). https://doi.org/10.1007/BF00886593

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Keywords

  • Contact Problem
  • Elasticity Theory