Shung Chu-hua. The General Derivation of Ritz Method and Trefftz Method in Elastomechanics[J]. Applied Mathematics and Mechanics, 1982, 3(5): 679-687.
Citation: Shung Chu-hua. The General Derivation of Ritz Method and Trefftz Method in Elastomechanics[J]. Applied Mathematics and Mechanics, 1982, 3(5): 679-687.

The General Derivation of Ritz Method and Trefftz Method in Elastomechanics

  • Received Date: 1981-08-14
  • Publish Date: 1982-10-15
  • This paper derives the Ritz method and Trefftz method in linear elastomechanis with the help of general mathematical expressions. Thus it is proved that Ritz method gives the upper bound of the corresponding functional extremurn, while Trefftz method gives its lower bound. At the same time it has been found that the eigenvalue problem (e.g. thenatural frequency problem) concerning the functional variational method in Trefftz method is in concord with the lower bound method of the loosened boundary condition which seeks for the eigenvalue. Of course, the results of this derivation are also applicable to the sort of functional variational method of which Euler's equation is linear positive definite.
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    钱伟长,《变分法和有限元》,上册,科学出版社(1980).
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    Weinstein, A. and Chien, W. Z.(钱伟长), On the vibration of a clamped plate under tension. Quarterly of Applied Mathematics,1, 1(1943), 61-68.
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    Weinstein, D. H., Modified Ritz Method. Proc. Nat. Acad. Sci., 20 (1934),529-532.
    [4]
    MacDonald, J. K. L.,on the modified variational method, Phys. Rev., 46(1934), 828-829.
    [5]
    Kohn, W., A note on Weinstein's variational method. Phys. Rev., 71 (1947), 902.
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