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Special Issue: Theoretical and Numerical Approaches to Dynamics of Selected Engineering ProblemsNo Access

ANALYTICAL PERTURBATION METHOD FOR CALCULATION OF SHELLS BASED ON 2D PADÉ APPROXIMANTS

    https://doi.org/10.1142/S0219455413400038Cited by:9
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    Abstract

    Calculations of nonlinear displacements and vibrations of inhomogeneous loaded shells with developable principal surface by means of different analytical methods are represented. It is shown that solutions to these methods are the expansions of exact solution in the Taylor series for an independent variable, and in the particular case — for the powers of a natural parameter. A method that provides a polynomial asymptotic approximation of the exact solution of the general form and its meromorphic continuation based on 1D and 2D Padé approximations is proposed. Calculations of nonlinear deformation and stability of elastic flexible circular cylindrical shell under uniform external pressures and of free oscillations of simply supported stringer shell demonstrate the efficiency and accuracy of the proposed method.

    This paper has been presented at the 11th Conference on Dynamical Systems — Theory and Applications (December 5–8, 2011, Lodz, Poland).

    References

    • G.   Adomian , Comp. Math. Appl.   21 , 101 ( 1989 ) . Crossref, ISIGoogle Scholar
    • I. V. Andrianov, V. I. Olevskij and S. Tokarzhevskij, Prikl. Mat. Mekh. 62(2), 334 (1998). Google Scholar
    • I. V. Andrianov, E. G. Kholod and V. I. Olevsky, J. Sound Vib. 194(3), 369 (1996). Crossref, ISIGoogle Scholar
    • J.   Awrejcewicz , I. V.   Andrianov and L. I.   Manevitch , Asymptotic Approaches in Nonlinear Dynamics: New Trends and Applications , Springer Series in Synergetics ( Springer , Berlin , 1998 ) . CrossrefGoogle Scholar
    • G. A. Baker Jr. and P.   Graves-Morris , Padé Approximants, Encyclopedia of Mathematics and Its Applications , 2nd edn. ( Cambridge University Press , Cambridge , 1996 ) . Google Scholar
    • M. Chrysos, F. Sanchez and Y. Cherruault, Kybernetes 31(6), 884 (2002). Crossref, ISIGoogle Scholar
    • E. E.   Grigolyuk and V. I.   Shalashilin , Problems of Nonlinear Deformation: The Continuation Method Applied to Nonlinear Problems in Solid Mechanics ( Kluwer , Dordrecht , 1991 ) . CrossrefGoogle Scholar
    • J. H.   He , Topological Meth. Nonlinear Anal.   31 , 205 ( 2008 ) . ISIGoogle Scholar
    • S. J.   Liao , Beyond Perturbation — Introduction to the Homotopy Analysis Method ( Chapman & Hall , Boca Raton , 2003 ) . CrossrefGoogle Scholar
    • I. F.   Obraztsov , B. V.   Nerubaylo and I. V.   Andrianov , Asymptotic Methods in the Structural Mechanics of Thin-Walled Structures ( Mashinostroenie , Moscow , 1991 ) . Google Scholar
    • V. V. Vavilov, M. K. Tchobanou and P. M. Tchobanou, Nonlinear Anal. Model. Control 7(1), 105 (2002). CrossrefGoogle Scholar
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