Application of the Ritz variational method for the problem of heat conduction through non-convex thick plates

Authors

  • Cristina Brădeanu Cluj-Napoca, Romania
  • Doina Brădeanu "Tiberiu Popoviciu" Institute of Numerical Analysis Academy, Cluj-Napoca, Romania
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References

Rectorys, K., Variational Methods in Mathematics, Science and Eingineering, D. Reidel, Dordrecht, 1975.

Mikhli, S.G., Variational Methods in Mathematical Physics, Macmillan, New York, 1964.

Kovalenko, A.D., Fundamentals of Termoelasticity, Nauka, Kiev, 1970 (in Russian).

Rvachev, V.L., Titzkii, V.P., Shevchenko, A. N., On the Resolution of a Thermoelasticity Problem for Isotropic Thin Plates with a Complicated Geometry, in: Mathematical Methods in the Physical-Mechanical Field, Nr.19, 1984, Isd. Naukova Dumka, Kiev (in Russian).

Rvachev, V.L., Theory of R-functions and Their Applications, Naukova Dumka, Kiev, 1982 (in Russian).

Kalinichenko, V.I., Koshii A.F., Ropavka, A.I., Numerical Solutions for Heat Transfer Problems, Harkov, 1987 (in Russian).

Dincă, Gh., Metode variaţionale şi aplicaţii, Editura Tehnică, Bucureşti, 1980 (in Romanian).

Grindei, I., Termoelasticitate, Editura Didactică şi Pedagogică, Bucureşti, 1967 (in Romanian).

Mikhlin, S.G., The Numerical Performance of Variational Methods, Nauka, Moskva, 1966 (in Russian).

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Published

1993-02-01

How to Cite

Brădeanu, C., & Brădeanu, D. (1993). Application of the Ritz variational method for the problem of heat conduction through non-convex thick plates. Rev. Anal. Numér. Théor. Approx., 22(1), 23–37. Retrieved from https://ictp.acad.ro/jnaat/journal/article/view/1993-vol22-no1-art2

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