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Learning Mixtures of Sparse Linear Regressions Using Sparse Graph Codes

Information Theory 2018-08-03 v2 math.IT

Abstract

In this paper, we consider the mixture of sparse linear regressions model. Let β(1),,β(L)Cn{\beta}^{(1)},\ldots,{\beta}^{(L)}\in\mathbb{C}^n be L L unknown sparse parameter vectors with a total of K K non-zero coefficients. Noisy linear measurements are obtained in the form yi=xiHβ(i)+wiy_i={x}_i^H {\beta}^{(\ell_i)} + w_i, each of which is generated randomly from one of the sparse vectors with the label i \ell_i unknown. The goal is to estimate the parameter vectors efficiently with low sample and computational costs. This problem presents significant challenges as one needs to simultaneously solve the demixing problem of recovering the labels i \ell_i as well as the estimation problem of recovering the sparse vectors β() {\beta}^{(\ell)} . Our solution to the problem leverages the connection between modern coding theory and statistical inference. We introduce a new algorithm, Mixed-Coloring, which samples the mixture strategically using query vectors xi {x}_i constructed based on ideas from sparse graph codes. Our novel code design allows for both efficient demixing and parameter estimation. In the noiseless setting, for a constant number of sparse parameter vectors, our algorithm achieves the order-optimal sample and time complexities of Θ(K)\Theta(K). In the presence of Gaussian noise, for the problem with two parameter vectors (i.e., L=2L=2), we show that the Robust Mixed-Coloring algorithm achieves near-optimal Θ(Kpolylog(n))\Theta(K polylog(n)) sample and time complexities. When K=O(nα)K=O(n^{\alpha}) for some constant α(0,1)\alpha\in(0,1) (i.e., KK is sublinear in nn), we can achieve sample and time complexities both sublinear in the ambient dimension. In one of our experiments, to recover a mixture of two regressions with dimension n=500n=500 and sparsity K=50K=50, our algorithm is more than 300300 times faster than EM algorithm, with about one third of its sample cost.

Keywords

Cite

@article{arxiv.1703.00641,
  title  = {Learning Mixtures of Sparse Linear Regressions Using Sparse Graph Codes},
  author = {Dong Yin and Ramtin Pedarsani and Yudong Chen and Kannan Ramchandran},
  journal= {arXiv preprint arXiv:1703.00641},
  year   = {2018}
}

Comments

To appear in IEEE Transactions on Information Theory

R2 v1 2026-06-22T18:33:12.947Z