Singularly Weighted X-ray Tensor Tomography
Abstract
If d is a boundary defining function for the Euclidean unit disk and I denotes the geodesic X-ray transform, for γ∈ (-1,1), we study the singularly-weighted X-ray transforms Im dγ acting on symmetric m-tensors. For any m, we provide a sharp range decomposition and characterization in terms of a distinguished Hilbert basis of the data space, that comes from earlier studies of the Singular Value Decomposition for the case m=0. Since for m 1, the transform considered has an infinite-dimensional kernel, we fully characterize this kernel, and propose a representative for an m-tensor to be reconstructed modulo kernel, along with efficient procedures to do so. This representative is based on a new generalization of the potential/conformal/transverse-tracefree decomposition of tensor fields in the context of singularly weighted L2-topologies.
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