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DY: Dynamik und Statistische Physik

DY 40: Statistical Physics (General) I

DY 40.5: Vortrag

Dienstag, 8. März 2005, 11:15–11:30, TU H3010

Nonlinear Tikhonov regularization for inverse problems with random noise — •Nicolai Bissantz¹, Thorsten Hohage², and Axel Munk¹ — ¹Institut für Mathematische Stochastik der Universität Göttingen — ²Institut für Numerische und Angewandte Mathematik der Universität Göttingen

We consider nonlinear statistical inverse problems described by operator equations F(a)=u. Here a is an element of a Hilbert space which we want to estimate, and u is an L²-function. The given data consist of measurements of u at n points, perturbed by random noise. We construct an estimator â_n for a by a combination of a local polynomial estimator and a nonlinear Tikhonov regularization and establish consistency in the sense that the mean integrated square error E|â_n−a|² (MISE) tends to 0 as n→∞ under reasonable assumptions. Moreover, if a satisfies a source condition, we show for â_n a convergence rate result for the MISE, as well as almost surely. Further, it is shown that a cross validated parameter selection yields a fully data driven consistent method for the reconstruction of a. Finally, the feasibility of our algorithm is investigated in a numerical study for a groundwater filtration problem and an inverse obstacle scattering problem.