ABSTRACT
A wave equation, derived under the acoustic medium assumption for P-waves
in transversely isotropic media with
a vertical symmetry axis (VTI media), though physically impossible,
yields good kinematic approximation to the
familiar elastic wave equation for VTI media.
The VTI acoustic wave equation is fourth-order and
has two sets of complex conjugate solutions. One set of solutions is just perturbations
of the familiar acoustic wavefield solutions
in isotropic media for incoming and outgoing waves. The second set
describes a wave type that propagates
at speeds slower than the P-wave
for the positive anisotropy parameter,  , and grows exponentially, becoming unstable, for negative
values of . Luckily, most values corresponding to anisotropies in the subsurface have positive values.
Placing the source in an isotropic
layer, a common occurrence in marine surveys where the water layer is isotropic,
eliminates most of the
energy of this additional wave type. Numerical examples
prove the usefulness of this acoustic equation in simulating
wave propagation in complex models. From this acoustic wave equation, the eikonal and transport equations that describe the ray theoretical aspects
of wave propagation are derived. These equations, based on the acoustic assumption (shear wave velocity
equals zero), are much simpler than their elastic counterparts, and yet yield exceptionally accurate
description of traveltime and geometrical amplitude, or wavefront spreading.
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