Inversion of electromagnetic induction data using a novel wavelet-based and scale-dependent regularization term

The inversion of electromagnetic induction data to a conductivity profile is an ill-posed problem. Regularization improves the stability of the inversion and a smoothing constraint is typically used. However, the conductivity profiles are not always expected to be smooth. Here, we develop a new inversion scheme in which we transform the model to the wavelet space and impose a sparsity constraint. This sparsity constrained inversion scheme will minimize an objective function with a least-squares data misfit and a sparsity measure of the model in the wavelet domain. A model transform to the wavelet domain allows to investigate the temporal resolution (periodicities at different frequencies) and spatial resolution (location of the peaks) characteristics of the model, and penalizing small-scale coefficients effectively reduces the complexity of the model. The novel scale-dependent regularization term can be used to favour either blocky or smooth structures, as well as high-amplitude models in globally smooth structures in the inversion. Depending on the expected conductivity profile, a suitable wavelet basis function can be chosen. The scheme supports multiple types of regularization with the same algorithm and is thus flexible. Finally, we apply this new scheme on a frequency domain electromagnetic sounding data set, but the scheme could equally apply to any other 1-D geophysical method.

Automated summary

The study proposes a new inversion scheme for electromagnetic induction data by leveraging the sparsity of the model in the wavelet domain, improving efficiency and accuracy. Transformation to the wavelet domain allows for exploration of the temporal and spatial characteristics of the model, simplifying it by reducing small-scale coefficients. The scheme supports various regularization methods and can choose different wavelet basis functions based on the desired conductivity profile.