English

Some Options for L1-Subspace Signal Processing

Machine Learning 2013-09-09 v1

Abstract

We describe ways to define and calculate L1L_1-norm signal subspaces which are less sensitive to outlying data than L2L_2-calculated subspaces. We focus on the computation of the L1L_1 maximum-projection principal component of a data matrix containing N signal samples of dimension D and conclude that the general problem is formally NP-hard in asymptotically large N, D. We prove, however, that the case of engineering interest of fixed dimension D and asymptotically large sample support N is not and we present an optimal algorithm of complexity O(ND)O(N^D). We generalize to multiple L1L_1-max-projection components and present an explicit optimal L1L_1 subspace calculation algorithm in the form of matrix nuclear-norm evaluations. We conclude with illustrations of L1L_1-subspace signal processing in the fields of data dimensionality reduction and direction-of-arrival estimation.

Keywords

Cite

@article{arxiv.1309.1194,
  title  = {Some Options for L1-Subspace Signal Processing},
  author = {Panos P. Markopoulos and George N. Karystinos and Dimitris A. Pados},
  journal= {arXiv preprint arXiv:1309.1194},
  year   = {2013}
}

Comments

In Proceedings Tenth Intern. Symposium on Wireless Communication Systems (ISWCS '13), Ilmenau, Germany, Aug. 27-30, 2013 (The 2013 ISWCS Best Paper Award in Physical Layer Comm. and Signal Processing); 5 pages; 3 figures

R2 v1 2026-06-22T01:21:02.433Z