Recovery of singularities for the weighted cone transform appearing in the Compton camera imaging

Abstract

We study the weighted cone transform I of distributions with compact support in a domain M of R3, over cone surfaces whose vertexes are located on a smooth surface away from M and opening angles are limited to an open interval of (0,π/2). We show that when the weight function has compact support and satisfies certain nonvanishing assumptions, the normal operator I* I is an elliptic at the accessible singularities. Then the accessible singularities are stably recoverable from local data. We prove a microlocal stability estimate for I. Moreover, we show the same analysis can be applied to the restricted cone transform.