Stability estimates for the regularized inversion of the truncated Hilbert transform

Abstract

In limited data computerized tomography, the 2D or 3D problem can be reduced to a family of 1D problems using the differentiated backprojection (DBP) method. Each 1D problem consists of recovering a compactly supported function f ∈ L2( F), where F is a finite interval, from its partial Hilbert transform data. When the Hilbert transform is measured on a finite interval G that only overlaps but does not cover F this inversion problem is known to be severely ill-posed [1]. In this paper, we study the reconstruction of f restricted to the overlap region F G. We show that with this restriction and by assuming prior knowledge on the L2 norm or on the variation of f, better stability with Hölder continuity (typical for mildly ill-posed problems) can be obtained.