论文信息 - Point force and point electric charge in infinite and semi-infinite transversely isotropic piezoelectric solids

Point force and point electric charge in infinite and semi-infinite transversely isotropic piezoelectric solids

Abstract For an infinite three-dimensional transversely isotropic piezoelectric material, Green's functions (which give the fuli set of electromechanical fields due to a point electric charge and an arbitrarily oriented point force) are derived in elementary functions in a simple way, using methods of the potential theory. For a semi-infinite transversely isotropic piezoelectric material. Green's functions are also derived, but in a limited way: a point force and a point electric charge are assumed to be applied at the boundary of the half-space. The latter solutions constitute a generalization of Boussinesqs and Cerruti's problems of elasticity for piezoelectric materials. The strength of the piezoeffect (the difference from the purely elastic case) is estimated for the example of the piezoceramics PZT-6B.

[1] W. P. Mason,et al. Piezoelectric Crystals and Their Applications to Ultrasonics , 1951 .

[2] V. I. Fabrikant,et al. Mixed Boundary Value Problems of Potential Theory and Their Applications in Engineering , 1991 .

[3] Y. Benveniste,et al. The determination of the elastic and electric fields in a piezoelectric inhomogeneity , 1992 .

[4] Martin L. Dunn,et al. Electroelastic Green's functions for transversely isotropic piezoelectric media and their application to the solution of inclusion and inhomogeneity problems , 1994 .

[5] Y. Benveniste. On the micromechanics of fibrous piezoelectric composites , 1994 .

[6] Min-zhong Wang,et al. Completeness and nonuniqueness ofgeneral solutions of transversely isotropic elasticity , 1995 .

[7] Martin L. Dunn,et al. Green's functions for transversely isotropic piezoelectric solids , 1996 .

[8] M. Hanson,et al. Concentrated ring loadings in a full space or half space: solutions for transverse isotropy and isotropy , 1997 .

[9] Thomas Michelitsch,et al. Calculation of the electroelastic Green’s function of the hexagonal infinite medium , 1997, 1503.03086.

[10] Martin L. Dunn,et al. Inclusions and inhomogeneities in transversely isotropic piezoelectric solids , 1997 .

[11] M. Hanson. Some observations on the potential functions for transverse isotropy in the presence of body forces , 1998 .

[12] M. Dunn,et al. Anisotropic coupled-field inclusion and inhomogeneity problems , 1998 .