摘要:Regularization is used to solve the ill-posed problem of magnetotelluric inversion usually by adding a stabilizing functional to the objective functional that allows us to obtain a stable solution.Among a number of possible stabilizing functionals, smoothing constraints are most commonly used, which produce spatially smooth inversion results.However, in some cases, the focused imaging of a sharp electrical boundary is necessary.Although past works have proposed functionals that may be suitable for the imaging of a sharp boundary, such as minimum support and minimum gradient support (MGS) functionals, they involve some difficulties and limitations in practice.In this paper, we propose a minimum support gradient (MSG) stabilizing functional as another possible choice of focusing stabilizer.In this approach, we calculate the gradient of the model stabilizing functional of the minimum support, which affects both the stability and the sharp boundary focus of the inversion.We then apply the discrete weighted matrix form of each stabilizing functional to build a unified form of the objective functional, allowing us to perform a regularized inversion with variety of stabilizing functionals in the same framework.By comparing the one-dimensional and two-dimensional synthetic inversion results obtained using the MSG stabilizing functional and those obtained using other stabilizing functionals, we demonstrate that the MSG results are not only capable of clearly imaging a sharp geoelectrical interface but also quite stable and robust.Overall good performance in terms of both data fitting and model recovery suggests that this stabilizing functional is effective and useful in practical applications.
关键词:Regularized inversion; Stabilizing functional; Minimum support gradient