English

Nonlinear frames and sparse reconstructions in Banach spaces

Information Theory 2015-06-12 v1 Functional Analysis math.IT Numerical Analysis

Abstract

In the first part of this paper, we consider nonlinear extension of frame theory by introducing bi-Lipschitz maps FF between Banach spaces. Our linear model of bi-Lipschitz maps is the analysis operator associated with Hilbert frames, pp-frames, Banach frames, g-frames and fusion frames. In general Banach space setting, stable algorithm to reconstruct a signal xx from its noisy measurement F(x)+ϵF(x)+\epsilon may not exist. In this paper, we establish exponential convergence of two iterative reconstruction algorithms when FF is not too far from some bounded below linear operator with bounded pseudo-inverse, and when FF is a well-localized map between two Banach spaces with dense Hilbert subspaces. The crucial step to prove the later conclusion is a novel fixed point theorem for a well-localized map on a Banach space. In the second part of this paper, we consider stable reconstruction of sparse signals in a union A{\bf A} of closed linear subspaces of a Hilbert space H{\bf H} from their nonlinear measurements. We create an optimization framework called sparse approximation triple (A,M,H)({\bf A}, {\bf M}, {\bf H}), and show that the minimizer x=argminx^M with F(x^)F(x0)ϵx^Mx^*={\rm argmin}_{\hat x\in {\mathbf M}\ {\rm with} \ \|F(\hat x)-F(x^0)\|\le \epsilon} \|\hat x\|_{\mathbf M} provides a suboptimal approximation to the original sparse signal x0Ax^0\in {\bf A} when the measurement map FF has the sparse Riesz property and almost linear property on A{\mathbf A}. The above two new properties is also discussed in this paper when FF is not far away from a linear measurement operator TT having the restricted isometry property.

Keywords

Cite

@article{arxiv.1506.03549,
  title  = {Nonlinear frames and sparse reconstructions in Banach spaces},
  author = {Qiyu Sun and Wai-Shing Tang},
  journal= {arXiv preprint arXiv:1506.03549},
  year   = {2015}
}
R2 v1 2026-06-22T09:51:33.751Z