Projections and Phase retrieval
Abstract
We characterize collections of orthogonal projections for which it is possible to reconstruct a vector from the magnitudes of the corresponding projections. As a result we are able to show that in an M-dimensional real vector space a vector can be reconstructed from the magnitudes of its projections onto a generic collection of N ≥ 2M-1 subspaces. We also show that this bound is sharp when N = 2k +1. The results of this paper answer a number of questions raised in CCPW:13.
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