Regularizing waveform inversion by projections onto convex sets

TitleRegularizing waveform inversion by projections onto convex sets
Publication TypeSINBAD Presentation
AuthorsBas Peters, Brendan R. Smithyman, Felix J. Herrmann
Year of Publication2015

A framework is proposed for regularizing the waveform inversion problem by projections onto intersections of convex sets. Multiple pieces of prior information about the geology are represented by multiple convex sets, for example limits on the velocity or minimum smoothness conditions on the model. The data-misfit is then minimized, such that the estimated model is always in the intersection of the convex sets. Therefore, it is clear what properties the estimated model will have at each iteration. This approach does not require any quadratic penalties to be used and thus avoids the known problems and limitations of those types of penalties. It is shown that by formulating waveform inversion as a constrained problem, regularization ideas such as Tikhonov regularization and gradient filtering can be incorporated into one framework. The algorithm is generally applicable, in the sense that it works with any (differentiable) objective function and does not require significant additional computation. The method is demonstrated on the inversion of the 2D marine isotropic elastic synthetic seismic benchmark by Chevron using an acoustic modeling code. To highlight the effect of the projections, we apply no data pre-processing.

KeywordsPresentation, private, SINBAD, SINBADSPRING2015, SLIM
Citation Keypeters2015SINBADrwi