Title of article
Saint-Venant end effects for plane deformations of linear piezoelectric solids
Author/Authors
Aless، نويسنده , , ra Borrelli، نويسنده , , Cornelius O. Horgan، نويسنده , , M. Cristina Patria، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
14
From page
943
To page
956
Abstract
The recent developments in smart structures technology have stimulated renewed interest in the fundamental theory
and applications of linear piezoelectricity. In this paper, we investigate the decay of Saint-Venant end effects for plane
deformations of a piezoelectric semi-infinite strip. First of all, we develop the theory of plane deformations for a general
anisotropic linear piezoelectric solid. Just as in the mechanical case, not all linear homogeneous anisotropic piezoelectric
cylindrical solids will sustain a non-trivial state of plane deformation. The governing system of four second-order partial
differential equations for the two in-plane displacements and electric potential are overdetermined in general. Sufficient
conditions on the elastic and piezoelectric constants are established that do allow for a state of plane deformation. The
resulting traction boundary-value problem with prescribed surface charge is an oblique derivative boundary-value
problem for a coupled elliptic system of three second-order partial differential equations. The special case of a piezoelectric
material transversely isotropic about the poling axis is then considered. Thus the results are valid for the hexagonal
crystal class 6mm. The geometry is then specialized to be a two-dimensional semi-infinite strip and the poling
axis is the axis transverse to the longitudinal direction. We consider such a strip with sides traction-free, subject to zero
surface charge and self-equilibrated conditions at the end and with tractions and surface charge assumed to decay to
zero as the axial variable tends to infinity. A formulation of the problem in terms of an Airy-type stress function
and an induction function is adopted. The governing partial differential equations are a coupled system of a fourth
and third-order equation for these two functions. On seeking solutions that exponentially decay in the axial direction
one obtains an eigenvalue problem for a coupled system of fourth and second-order ordinary differential equations. This
problem is the piezoelectric analog of the well-known eigenvalue problem arising in the case of an anisotropic elastic
strip. It is shown that the problem can be uncoupled to an eigenvalue problem for a single sixth-order ordinary differential
equation with complex eigenvalues characterized as roots of transcendental equations governing symmetric and
Keywords
Linear piezoelectric materials , Plane deformations , Saint-Venant end effects
Journal title
International Journal of Solids and Structures
Serial Year
2006
Journal title
International Journal of Solids and Structures
Record number
448419
Link To Document