Abstract
Accurate estimation of the velocity field is the most difficult step in imaging of seismic data for anisotropic media. Here, the velocity-analysis problem is examined for the most common anisotropic model of sedimentary formations—transverse isotropy (TI) with arbitrary orientation of the symmetry axis. We show that supplementing wide-azimuth reflected PP data with mode-converted (PS) waves yields more stable estimates of the anisotropic coefficients and, in many cases, helps to constrain the model in depth.
An important processing step preceding the inversion is computation of the traveltimes of the pure SS-waves from those of the PP- and PS-waves based on a technique recently developed by Grechka and Tsvankin. This procedure allows us to replace PS-wave moveout, which is generally asymmetric with respect to zero offset, with the symmetric (hyperbolic on short spreads) moveout of the pure SS reflections. Then, generalizing the algorithm previously suggested for PP data, we develop a joint tomographic inversion of the normal-moveout (NMO) ellipses and zero-offset traveltimes of PP- and SS-waves.
Application of the method to wide-azimuth PP and PS reflections from a dipping interface beneath a homogeneous TI layer shows that for a range of reflector dips and tilt angles of the symmetry axis, it is possible to build the anisotropic velocity field in the depth domain. We also extend our inversion procedure to layered TI media with curved interfaces and study its stability in the presence of noise and heterogeneity.