English

Multipolar Acoustic Source Reconstruction from Sparse Far-Field Data using ALOHA

Information Theory 2023-10-31 v2 Signal Processing math.IT

Abstract

The reconstruction of multipolar acoustic or electromagnetic sources from their far-field signature plays a crucial role in numerous applications. Most of the existing techniques require dense multi-frequency data at the Nyquist sampling rate. The availability of a sub-sampled grid contributes to the null space of the inverse source-to-data operator, which causes significant imaging artifacts. For this purpose, additional knowledge about the source or regularization is required. In this letter, we propose a novel two-stage strategy for multipolar source reconstruction from sub-sampled sparse data that takes advantage of the sparsity of the sources in the physical domain. The data at the Nyquist sampling rate is recovered from sub-sampled data and then a conventional inversion algorithm is used to reconstruct sources. The data recovery problem is linked to a spectrum recovery problem for the signal with the \textit{finite rate of innovations} (FIR) that is solved using an annihilating filter-based structured Hankel matrix completion approach (ALOHA). For an accurate reconstruction, a Fourier inversion algorithm is used. The suitability of the approach is supported by experiments.

Keywords

Cite

@article{arxiv.2303.12662,
  title  = {Multipolar Acoustic Source Reconstruction from Sparse Far-Field Data using ALOHA},
  author = {Yukun Guo and Abdul Wahab and Xianchao Wang},
  journal= {arXiv preprint arXiv:2303.12662},
  year   = {2023}
}

Comments

11 pages, 2 figures

R2 v1 2026-06-28T09:28:19.918Z