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Eller, Matthias [Author]; Griesmaier, Roland [Author]; Rieder, Andreas [Author]

Tangential cone condition for the full waveform forward operator in the viscoelastic regime: the non-local case

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  • Media type: E-Book; Report; Text
  • Title: Tangential cone condition for the full waveform forward operator in the viscoelastic regime: the non-local case
  • Contributor: Eller, Matthias [Author]; Griesmaier, Roland [Author]; Rieder, Andreas [Author]
  • imprint: Karlsruher Institut für Technologie, 2023-02-09
  • Language: English
  • DOI: https://doi.org/10.5445/IR/1000155827
  • ISSN: 2365-662X
  • Keywords: viscoelastic wave equation ; full waveform seismic inversion ; nonlinear illposed problem ; Lipschitz stability ; Mathematics ; tangential cone condition
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  • Description: We discuss mapping properties of the parameter-to-state map of full waveform inversion and generalize the results of [M. Eller and A. Rieder, Inverse Problems 37 (2021) 085011] from the acoustic to the viscoelastic wave equation. In particular we establish injectivity of the Fréchet derivative of the parameter-to-state map for a semi-discrete seismic inverse problem in the viscoelastic regime. Here, the finite dimensional parameter space is restricted to functions having global support in the propagation medium (the non-local case) and that are locally linearly independent. As a consequence we deduce local conditional wellposedness of this nonlinear inverse problem. Furthermore, we show that the tangential cone condition holds, which is an essential prerequisite in the convergence analysis of a variety of inversion algorithms for nonlinear illposed problems.
  • Access State: Open Access