6533b85efe1ef96bd12c0868

RESEARCH PRODUCT

Carleman estimates for geodesic X-ray transforms

Gabriel P. PaternainMikko Salo

subject

Mathematics - Differential GeometryMathematics - Analysis of PDEsDifferential Geometry (math.DG)FOS: MathematicsMathematics::Differential GeometryDynamical Systems (math.DS)Mathematics - Dynamical SystemsAnalysis of PDEs (math.AP)

description

In this article we introduce an approach for studying the geodesic X-ray transform and related geometric inverse problems by using Carleman estimates. The main result states that on compact negatively curved manifolds (resp. nonpositively curved simple or Anosov manifolds), the geodesic vector field satisfies a Carleman estimate with logarithmic weights (resp. linear weights) on the frequency side. As a particular consequence, on negatively curved simple manifolds the geodesic X-ray transform with attenuation given by a general connection and Higgs field is invertible modulo natural obstructions. The proof is based on showing that the Pestov energy identity for the geodesic vector field completely localizes in frequency. Our approach works in all dimensions $\geq 2$, on negatively curved manifolds with or without boundary, and for tensor fields of any order.

yearjournalcountryeditionlanguage
2018-05-06
https://dx.doi.org/10.48550/arxiv.1805.02163