New Conditions for Sparse Phase Retrieval

Abstract

We consider the problem of sparse phase retrieval, where a k-sparse signal x ∈ Rn (or Cn) is measured as y = | Ax|, where A ∈ Rm × n (or Cm × n respectively) is a measurement matrix and |·| is the element-wise absolute value. For a real signal and a real measurement matrix A, we show that m = 2k measurements are necessary and sufficient to recover x uniquely. For complex signal x ∈ Cn and A ∈ Cm × n, we show that m = 4k-2 phaseless measurements are sufficient to recover x. It is known that the multiplying constant 4 in m = 4k-2 cannot be improved.