English

Dual Space Preconditioning for Gradient Descent

Optimization and Control 2020-12-09 v4

Abstract

The conditions of relative smoothness and relative strong convexity were recently introduced for the analysis of Bregman gradient methods for convex optimization. We introduce a generalized left-preconditioning method for gradient descent, and show that its convergence on an essentially smooth convex objective function can be guaranteed via an application of relative smoothness in the dual space. Our relative smoothness assumption is between the designed preconditioner and the convex conjugate of the objective, and it generalizes the typical Lipschitz gradient assumption. Under dual relative strong convexity, we obtain linear convergence with a generalized condition number that is invariant under horizontal translations, distinguishing it from Bregman gradient methods. Thus, in principle our method is capable of improving the conditioning of gradient descent on problems with non-Lipschitz gradient or non-strongly convex structure. We demonstrate our method on p-norm regression and exponential penalty function minimization.

Keywords

Cite

@article{arxiv.1902.02257,
  title  = {Dual Space Preconditioning for Gradient Descent},
  author = {Chris J. Maddison and Daniel Paulin and Yee Whye Teh and Arnaud Doucet},
  journal= {arXiv preprint arXiv:1902.02257},
  year   = {2020}
}

Comments

SIAM J. Optim, accepted

R2 v1 2026-06-23T07:33:45.310Z