English

A first-order optimization algorithm for statistical learning with hierarchical sparsity structure

Optimization and Control 2020-10-20 v3 Computation

Abstract

In many statistical learning problems, it is desired that the optimal solution conforms to an a priori known sparsity structure represented by a directed acyclic graph. Inducing such structures by means of convex regularizers requires nonsmooth penalty functions that exploit group overlapping. Our study focuses on evaluating the proximal operator of the Latent Overlapping Group lasso developed by Jacob et al. (2009). We implemented an Alternating Direction Method of Multiplier with a sharing scheme to solve large-scale instances of the underlying optimization problem efficiently. In the absence of strong convexity, global linear convergence of the algorithm is established using the error bound theory. More specifically, the paper contributes to establishing primal and dual error bounds when the nonsmooth component in the objective function does not have a polyhedral epigraph. We also investigate the effect of the graph structure on the speed of convergence of the algorithm. Detailed numerical simulation studies over different graph structures supporting the proposed algorithm and two applications in learning are provided.

Keywords

Cite

@article{arxiv.2001.03322,
  title  = {A first-order optimization algorithm for statistical learning with hierarchical sparsity structure},
  author = {Dewei Zhang and Yin Liu and Sam Davanloo Tajbakhsh},
  journal= {arXiv preprint arXiv:2001.03322},
  year   = {2020}
}
R2 v1 2026-06-23T13:07:42.738Z