1/3 SUBHARMONIC SOLUTION OF ELLIPTICAL SANDWICH PLATES

Abstract

Abstract: The problem of nonlinear forced oscillations for elliptical sandwich plates is dealt with. Based on the governing equations expressed in terms of five displacement components, the nonlinear dynamic equation of an elliptical sandwich plate under a harmonic force is derived. A superpositive-iterative harmonic balance (SIHB) method is presented for the steady-state analysis of strongly nonlinear oscillators. In a periodic oscillation, the periodic solutions can be expressed in the form of basic harmonics and bifurcate harmonics. Thus, an oscillation system which is described as a second order ordinary differential equation, can be expressed as fundamental differential equation with fundamental harmonics and incremental differential equation with derived harmonics. The 1/3 subharmonic solution of an elliptical sandwich plate is investigated by using the methods of SIHB. The SIHB method is compared with the numerical integration method. Finally, asymptotical stability of the 1/3 subharmonic oscillations is inspected.

2010 MSC Number:

O322
O343.9

LI Yin-shan;ZHANG Nian-mei;YANG Gui-tong. 1/3 SUBHARMONIC SOLUTION OF ELLIPTICAL SANDWICH PLATES. Applied Mathematics and Mechanics (English Edition), 2003, 24(10): 1147-1157.

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References

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