The Light Ray Transform in Stationary and Static Lorentzian Geometries
Feizmohammadi, A., Ilmavirta, J., & Oksanen, L. (2021). The Light Ray Transform in Stationary and Static Lorentzian Geometries. Journal of Geometric Analysis, 31(4), 3656-3682. https://doi.org/10.1007/s12220-020-00409-y
Julkaistu sarjassa
Journal of Geometric AnalysisPäivämäärä
2021Oppiaine
MatematiikkaInversio-ongelmien huippuyksikköMathematicsCentre of Excellence in Inverse ProblemsTekijänoikeudet
© The Authors 2020
Given a Lorentzian manifold, the light ray transform of a function is its integrals along null geodesics. This paper is concerned with the injectivity of the light ray transform on functions and tensors, up to the natural gauge for the problem. First, we study the injectivity of the light ray transform of a scalar function on a globally hyperbolic stationary Lorentzian manifold and prove injectivity holds if either a convex foliation condition is satisfied on a Cauchy surface on the manifold or the manifold is real analytic and null geodesics do not have cut points. Next, we consider the light ray transform on tensor fields of arbitrary rank in the more restrictive class of static Lorentzian manifolds and show that if the geodesic ray transform on tensors defined on the spatial part of the manifold is injective up to the natural gauge, then the light ray transform on tensors is also injective up to its natural gauge. Finally, we provide applications of our results to some inverse problems about recovery of coefficients for hyperbolic partial differential equations from boundary data.
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https://converis.jyu.fi/converis/portal/detail/Publication/35315024
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A.F. was supported by EPSRC Grant EP/P01593X/1, J.I. was supported by the Academy of Finland (decision 295853) and L.O. was supported by the EPSRC Grants EP/P01593X/1 and EP/R002207/1.Lisenssi
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