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Bibliographic Details
Main Author: Busch, Leonard
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2505.08472
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author Busch, Leonard
author_facet Busch, Leonard
contents We establish a general result about the recovery of the analytic wavefront set of a distribution from the analytic wavefront set of its transform coming from a classical elliptic analytic Fourier integral operator (FIO) satisfying some conditions including the Bolker condition. Furthermore, we give a simple explicit analytic parametrix in the form of a classical elliptic analytic FIO for general analytic second order hyperbolic differential operators. Finally, we apply these results together with microlocal analytic continuation and a layer stripping argument to a problem from seismic inversion to prove the injectivity of a linearized operator in the analytic setting. It is the use of wave packet techniques that allows us to give the precise relation how the FIOs under consideration transform the analytic wavefront set, whereas the explicit analytic parametrix comes from a reformulation of the parametrix construction of Hadamard and Hörmander.
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spellingShingle Analytic Fourier Integral Operators and a Problem from Seismic Inversion
Busch, Leonard
Analysis of PDEs
We establish a general result about the recovery of the analytic wavefront set of a distribution from the analytic wavefront set of its transform coming from a classical elliptic analytic Fourier integral operator (FIO) satisfying some conditions including the Bolker condition. Furthermore, we give a simple explicit analytic parametrix in the form of a classical elliptic analytic FIO for general analytic second order hyperbolic differential operators. Finally, we apply these results together with microlocal analytic continuation and a layer stripping argument to a problem from seismic inversion to prove the injectivity of a linearized operator in the analytic setting. It is the use of wave packet techniques that allows us to give the precise relation how the FIOs under consideration transform the analytic wavefront set, whereas the explicit analytic parametrix comes from a reformulation of the parametrix construction of Hadamard and Hörmander.
title Analytic Fourier Integral Operators and a Problem from Seismic Inversion
topic Analysis of PDEs
url https://arxiv.org/abs/2505.08472