English

On Lipschitz Analysis and Lipschitz Synthesis for the Phase Retrieval Problem

Functional Analysis 2015-06-09 v1 Optimization and Control Quantum Algebra

Abstract

In this paper we prove two results regarding reconstruction from magnitudes of frame coefficients (the so called "phase retrieval problem"). First we show that phase retrievability as an algebraic property implies that nonlinear maps are bi-Lipschitz with respect to appropriate metrics on the quotient space. Second we prove that reconstruction can be performed using Lipschitz continuous maps. Specifically we show that when nonlinear analysis maps α,β:H^Rm\alpha,\beta:\hat{H}\rightarrow R^m are injective, with α(x)=(x,fk)k=1m\alpha(x)=(|\langle x,f_k\rangle |)_{k=1}^m and β(x)=(x,fk2)k=1m\beta(x)=(|\langle x,f_k \rangle|^2)_{k=1}^m, where {f1,,fm}\{f_1,\ldots,f_m\} is a frame for a Hilbert space HH and H^=H/T1\hat{H}=H/T^1, then α\alpha is bi-Lipschitz with respect to the class of "natural metrics" Dp(x,y)=minφxeiφypD_p(x,y)= min_{\varphi} || x-e^{i\varphi}y {||}_p, whereas β\beta is bi-Lipschitz with respect to the class of matrix-norm induced metrics dp(x,y)=xxyypd_p(x,y)=|| xx^*-yy^*{||}_p. Furthermore, there exist left inverse maps ω,ψ:RmH^\omega,\psi:R^m\rightarrow \hat{H} of α\alpha and β\beta respectively, that are Lipschitz continuous with respect to the appropriate metric. Additionally we obtain the Lipschitz constants of these inverse maps in terms of the lower Lipschitz constants of α\alpha and β\beta. Surprisingly the increase in Lipschitz constant is a relatively small factor, independent of the space dimension or the frame redundancy.

Keywords

Cite

@article{arxiv.1506.02092,
  title  = {On Lipschitz Analysis and Lipschitz Synthesis for the Phase Retrieval Problem},
  author = {Radu Balan and Dongmian Zou},
  journal= {arXiv preprint arXiv:1506.02092},
  year   = {2015}
}

Comments

26 pages, 1 figure; presented in part at ICHAA 2015 Conference, NY

R2 v1 2026-06-22T09:48:21.563Z