On the exactness of the universal backprojection formula for the spherical means Radon transform

Abstract

The spherical means Radon transform Mf(x,r) is defined by the integral of a function f in Rn over the sphere S(x,r) of radius r centered at a x, normalized by the area of the sphere. The problem of reconstructing f from the data Mf(x,r) where x belongs to a hypersurface ⊂Rn and r ∈(0,∞) has important applications in modern imaging modalities, such as photo- and thermo- acoustic tomography. When coincides with the boundary ∂ of a bounded (convex) domain ⊂Rn, a function supported within can be uniquely recovered from its spherical means known on . We are interested in explicit inversion formulas for such a reconstruction. If =∂, such formulas are only known for the case when is an ellipsoid (or one of its partial cases). This gives rise to the natural question: can explicit inversion formulas be found for other closed hypersurfaces ? In this article we prove, for the so-called "universal backprojection inversion formulas", that their extension to non-ellipsoidal domains is impossible, and therefore ellipsoids constitute the largest class of closed convex hypersurfaces for which such formulas hold.

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