Frank-Wolfe Algorithms for Saddle Point Problems

Gauthier Gidel, Tony Jebara, Simon Lacoste-Julien

AISTATS 2017 pp. 362-371

/aistats/2017/gidel2017aistats-frank/

Abstract

We extend the Frank-Wolfe (FW) optimization algorithm to solve constrained smooth convex-concave saddle point (SP) problems. Remarkably, the method only requires access to linear minimization oracles. Leveraging recent advances in FW optimization, we provide the first proof of convergence of a FW-type saddle point solver over polytopes, thereby partially answering a 30 year-old conjecture. We also survey other convergence results and highlight gaps in the theoretical underpinnings of FW-style algorithms. Motivating applications without known efficient alternatives are explored through structured prediction with combinatorial penalties as well as games over matching polytopes involving an exponential number of constraints.

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Cite

Text

Gidel et al. "Frank-Wolfe Algorithms for Saddle Point Problems." International Conference on Artificial Intelligence and Statistics, 2017.

Markdown

[Gidel et al. "Frank-Wolfe Algorithms for Saddle Point Problems." International Conference on Artificial Intelligence and Statistics, 2017.](https://mlanthology.org/aistats/2017/gidel2017aistats-frank/)

BibTeX

@inproceedings{gidel2017aistats-frank,
  title     = {{Frank-Wolfe Algorithms for Saddle Point Problems}},
  author    = {Gidel, Gauthier and Jebara, Tony and Lacoste-Julien, Simon},
  booktitle = {International Conference on Artificial Intelligence and Statistics},
  year      = {2017},
  pages     = {362-371},
  url       = {https://mlanthology.org/aistats/2017/gidel2017aistats-frank/}
}