Refined analysis of axi-symmetric circular cylinder in the axial magnetic field without ad hoc assumption

Baosheng ZHAO; Yang GAO; Yingtao ZHAO; Dechen ZHANG

doi:10.1007/s11465-011-0232-0

Front. Mech. Eng. ›› 2011, Vol. 6 ›› Issue (3) : 318 -323. DOI: 10.1007/s11465-011-0232-0

RESEARCH ARTICLE

Refined analysis of axi-symmetric circular cylinder in the axial magnetic field without ad hoc assumption

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Abstract

The refined theory for axi-symmetric magnetoelastic circular cylinder is deduced systematically and directly from linear magnetoelasticity theory. Based on the general solution of magnetoelastic equation and the Lur’e method, the refined theory yields the solutions for magnetoelastic circular cylinder without ad hoc assumptions. On the basis of the refined theory developed in the present study, solutions are obtained for magnetoelastic circular cylinder with homogeneous and non-homogenous boundary conditions, respectively. For the circular cylinder with homogeneous boundary conditions, the refined theory provides exact solutions that satisfy all of the governing equations. The exact solutions can be divided into three parts: the 2-orders equation, the transcendental equation, and the magnetic equation. In the case of non-homogenous boundary conditions, the approximate governing equations are accurate up to the high-order terms with respect to cylinder radius.

Keywords

refined analysis / axially symmetric deformation / circular cylinder / Bessel’s function / axial magnetic field

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Baosheng ZHAO, Yang GAO, Yingtao ZHAO, Dechen ZHANG. Refined analysis of axi-symmetric circular cylinder in the axial magnetic field without ad hoc assumption. Front. Mech. Eng., 2011, 6(3): 318-323 DOI:10.1007/s11465-011-0232-0

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References

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[1]	Moon F C, Pao Y H. Magnetoelastic buckling of a thin plate. Journal of Applied Mechanics, 1968, 35: 53-58

[2]	Zhou Y H, Zheng X J. A theoretical model of magnetoelastic buckling for soft ferromagnetic thin plates. Acta Mechanica Sinica, 1996, 12(3): 213-224

[3]	Zhou Y H, Zheng X J. A variational principle on magnetoelastic interaction of ferromagnetic thin plates. Acta Mech Solids Sinica, 1997, 10(1): 1-10

[4]	Brown W F. Magnetoelastic Interactions. New York: Springer-Verlag, 1966.

[5]	Pao Y H, Yeh C S. A linear theory for soft ferromagnetic elastic solids. International Journal of Engineering Science, 1973, 11(4): 415-436

[6]	Huang K F, Wang M Z. Complete solution of the linear magnetoelasticity and the magnetic fields in a magnetized elastic half-space. Journal of Applied Mechanics, 1995, 62(4): 930-934

[7]	Cheng S. Elasticity theory of plates and a refined theory. Journal of Applied Mechanics, 1979, 46(3): 644-650

[8]	Lur’e A I. Three-Dimensional Problems of the Theory of Elasticity. New York: Interscience Press, 1964

[9]	Gao Y, Zhao B S. The refined theory for a magnetoelastic body-I. plate problems. International Journal of Applied Electromagnetics and Mechanics, 2009, 29: 1-14