English

Regularized Modified BPDN for Noisy Sparse Reconstruction with Partial Erroneous Support and Signal Value Knowledge

Information Theory 2016-11-17 v3 math.IT

Abstract

We study the problem of sparse reconstruction from noisy undersampled measurements when the following two things are available. (1) We are given partial, and partly erroneous, knowledge of the signal's support, denoted by TT. (2) We are also given an erroneous estimate of the signal values on TT, denoted by (μ^)T(\hat{\mu})_T. In practice, both these may be available from available prior knowledge. Alternatively, in recursive reconstruction applications, like real-time dynamic MRI, one can use the support estimate and the signal value estimate from the previous time instant as TT and (μ^)T(\hat{\mu})_T. In this work, we introduce regularized modified-BPDN (reg-mod-BPDN) and obtain computable bounds on its reconstruction error. Reg-mod-BPDN tries to find the signal that is sparsest outside the set TT, while being "close enough" to (μ^)T(\hat{\mu})_T on TT and while satisfying the data constraint. Corresponding results for modified-BPDN and BPDN follow as direct corollaries. A second key contribution is an approach to obtain computable error bounds that hold without any sufficient conditions. This makes it easy to compare the bounds for the various approaches. Empirical reconstruction error comparisons with many existing approaches are also provided.

Keywords

Cite

@article{arxiv.1002.0019,
  title  = {Regularized Modified BPDN for Noisy Sparse Reconstruction with Partial Erroneous Support and Signal Value Knowledge},
  author = {Wei Lu and Namrata Vaswani},
  journal= {arXiv preprint arXiv:1002.0019},
  year   = {2016}
}

Comments

30 pages, 5 figures

R2 v1 2026-06-21T14:41:24.995Z