On Sobolev instability of the interior problem of tomography

Abstract

In this paper we continue investigation of the interior problem of tomography that was started in BKT2. As is known, solving the interior problem with prior data specified on a finite collection of intervals Ii is equivalent to analytic continuation of a function from Ii to an open set J. In the paper we prove that this analytic continuation can be obtained with the help of a simple explicit formula, which involves summation of a series. Our second result is that the operator of analytic continuation is not stable for any pair of Sobolev spaces regardless of how close the set J is to Ii. Our main tool is the singular value decomposition of the operator H-1e that arises when the interior problem is reduced to a problem of inverting the Hilbert transform from incomplete data. The asymptotics of the singular values and singular functions of H-1e, the latter being valid uniformly on compact subsets of the interior of Ii, was obtained in BKT2. Using these asymptotics we can accurately measure the degree of ill-posedness of the analytic continuation as a function of the target interval J. Our last result is the convergence of the asymptotic approximation of the singular functions in the L2(Ii) sense.