English

Truncated Sparse Approximation Property and Truncated $q$-Norm Minimization

Information Theory 2021-05-28 v1 math.IT

Abstract

This paper considers approximately sparse signal and low-rank matrix's recovery via truncated norm minimization minxxTq\min_{x}\|x_T\|_q and minXXTSq\min_{X}\|X_T\|_{S_q} from noisy measurements. We first introduce truncated sparse approximation property, a more general robust null space property, and establish the stable recovery of signals and matrices under the truncated sparse approximation property. We also explore the relationship between the restricted isometry property and truncated sparse approximation property. And we also prove that if a measurement matrix AA or linear map A\mathcal{A} satisfies truncated sparse approximation property of order kk, then the first inequality in restricted isometry property of order kk and of order 2k2k can hold for certain different constants δk\delta_{k} and δ2k\delta_{2k}, respectively. Last, we show that if δt(k+Tc)<(t1)/t\delta_{t(k+|T^c|)}<\sqrt{(t-1)/t} for some t4/3t\geq 4/3, then measurement matrix AA and linear map A\mathcal{A} satisfy truncated sparse approximation property of order kk. Which should point out is that when Tc=T^c=\emptyset, our conclusion implies that sparse approximation property of order kk is weaker than restricted isometry property of order tktk.

Keywords

Cite

@article{arxiv.1806.10788,
  title  = {Truncated Sparse Approximation Property and Truncated $q$-Norm Minimization},
  author = {Wengu Chen and Peng Li},
  journal= {arXiv preprint arXiv:1806.10788},
  year   = {2021}
}
R2 v1 2026-06-23T02:44:24.260Z