Approximation and Reconstruction from Attenuated Radon Projections
Abstract
Attenuated Radon projections with respect to the weight function Wμ(x,y) = (1-x2-y2)μ-1/2 are shown to be closely related to the orthogonal expansion in two variables with respect to Wμ. This leads to an algorithm for reconstructing two dimensional functions (images) from attenuated Radon projections. Similar results are established for reconstructing functions on the sphere from projections described by integrals over circles on the sphere, and for reconstructing functions on the three-dimensional ball and cylinder domains.
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