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Injectivity and Stability for a Generic Class of Generalized Radon Transforms.

Published version
Peer-reviewed

Type

Article

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Authors

Homan, Andrew 

Abstract

Let (M, g) be an analytic, compact, Riemannian manifold with boundary, of dimension n ≥ 2 . We study a class of generalized Radon transforms, integrating over a family of hypersurfaces embedded in M, satisfying the Bolker condition (in: Quinto, Proceedings of conference "Seventy-five Years of Radon Transforms", Hong Kong, 1994). Using analytic microlocal analysis, we prove a microlocal regularity theorem for generalized Radon transforms on analytic manifolds defined on an analytic family of hypersurfaces. We then show injectivity and stability for an open, dense subset of smooth generalized Radon transforms satisfying the Bolker condition, including the analytic ones.

Description

Keywords

Analytic microlocal analysis, Bolker condition, Generalized Radon transforms, Microlocal analysis

Journal Title

J Geom Anal

Conference Name

Journal ISSN

1050-6926
1559-002X

Volume Title

Publisher

Springer Science and Business Media LLC
Sponsorship
Both authors were partly supported by NSF grants.