Uniqueness Theorems for Tomographic Phase Retrieval with Few Diffraction Patterns
Abstract
3D tomographic phase retrieval under the Born approximation for discrete objects supported on a n× n× n grid is analyzed. It is proved that n projections are sufficient and necessary for unique determination by computed tomography (CT) with full projected field measurements and that n+1 coded projected diffraction patterns are sufficient for unique determination, up to a global phase factor, in tomographic phase retrieval. Hence n+1 is nearly, if not exactly, the minimum number of diffractions patterns needed for 3D tomographic phase retrieval under the Born approximation.
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