Sorting out the elastic anisotropy of transversely isotropic materials

The section of the slowness surface of a transversely isotropic elastic material in a zonal plane consists of an ellipse and a quartic curve with two nested branches, the inner of which is convex. Concavities can therefore occur only on the outer branch S and five possibilities arise: (I) S is conve

Firstly, the extended Boussinesq and Cerruti solutions for point forces and point charge acting on the surface of a transversely isotropic piezoelectric half-space are derived. Secondly, aiming at a series of common three-dimensional contact including spherical contact, a conical indentor and an upr

In this paper we give the generalized Boussinesq Galerkin general solution of transversely isotropic elasticity, as well as its simplified forms in two special cases. And we prove the completeness of the Lekhnitskii-Hu-Nowacki solution and the Ellion--Lodge solution in such cases that sO, s~ and s~

In the present work two basic aspects of the theory of anisotropic elasticity are studied, namely the estimation of the lower and upper bounds in the variation of elastic moduli of transversely isotropic rocks and the possibility of the existence of phenomenological (empirical) relations among the e