English

Matrix Completion and Related Problems via Strong Duality

Data Structures and Algorithms 2018-04-26 v5 Machine Learning Machine Learning

Abstract

This work studies the strong duality of non-convex matrix factorization problems: we show that under certain dual conditions, these problems and its dual have the same optimum. This has been well understood for convex optimization, but little was known for non-convex problems. We propose a novel analytical framework and show that under certain dual conditions, the optimal solution of the matrix factorization program is the same as its bi-dual and thus the global optimality of the non-convex program can be achieved by solving its bi-dual which is convex. These dual conditions are satisfied by a wide class of matrix factorization problems, although matrix factorization problems are hard to solve in full generality. This analytical framework may be of independent interest to non-convex optimization more broadly. We apply our framework to two prototypical matrix factorization problems: matrix completion and robust Principal Component Analysis (PCA). These are examples of efficiently recovering a hidden matrix given limited reliable observations of it. Our framework shows that exact recoverability and strong duality hold with nearly-optimal sample complexity guarantees for matrix completion and robust PCA.

Keywords

Cite

@article{arxiv.1704.08683,
  title  = {Matrix Completion and Related Problems via Strong Duality},
  author = {Maria-Florina Balcan and Yingyu Liang and David P. Woodruff and Hongyang Zhang},
  journal= {arXiv preprint arXiv:1704.08683},
  year   = {2018}
}

Comments

37 pages, 4 figures

R2 v1 2026-06-22T19:30:08.615Z