Extreme least singular values of Gaussian row submatrices and a phase retrieval stability problem
Abstract
Let F∈\ R, C\ and d F= R F. If Am∈ FNm× m has independent standard Gaussian entries and Nm/mγ>1, then \[ T⊂[Nm]\\ |T|=m σ(Am,T) = (γγ(γ-1)γ-1)-m/d F+oP(m) . \] If Nm=γm+O(1), the convergence of m-1 Mm F has probability error O(m-1). In particular, at the real phase-retrieval threshold N=2m-1, \[ ω(Am)=4-m+oP(m), \] so the Gaussian Balan--Wang critical exponential base is 1/4.
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