Riemannian Optimization via Frank-Wolfe Methods

Author(s)

Weber, Melanie; Sra, Suvrit

Abstract

Abstract We study projection-free methods for constrained Riemannian optimization. In particular, we propose a Riemannian Frank-Wolfe (RFW) method that handles constraints directly, in contrast to prior methods that rely on (potentially costly) projections. We analyze non-asymptotic convergence rates of RFW to an optimum for geodesically convex problems, and to a critical point for nonconvex objectives. We also present a practical setting under which RFW can attain a linear convergence rate. As a concrete example, we specialize RFW to the manifold of positive definite matrices and apply it to two tasks: (i) computing the matrix geometric mean (Riemannian centroid); and (ii) computing the Bures-Wasserstein barycenter. Both tasks involve geodesically convex interval constraints, for which we show that the Riemannian “linear” oracle required by RFW admits a closed form solution; this result may be of independent interest. We complement our theoretical results with an empirical comparison of RFW against state-of-the-art Riemannian optimization methods, and observe that RFW performs competitively on the task of computing Riemannian centroids.

Date issued

2022-07-14

URI

https://hdl.handle.net/1721.1/143783

Publisher

Springer Berlin Heidelberg

Citation

Weber, Melanie and Sra, Suvrit. 2022. "Riemannian Optimization via Frank-Wolfe Methods."

Version: Final published version