English

Time-Reversed Dissipation Induces Duality Between Minimizing Gradient Norm and Function Value

Optimization and Control 2023-11-02 v3

Abstract

In convex optimization, first-order optimization methods efficiently minimizing function values have been a central subject study since Nesterov's seminal work of 1983. Recently, however, Kim and Fessler's OGM-G and Lee et al.'s FISTA-G have been presented as alternatives that efficiently minimize the gradient magnitude instead. In this paper, we present H-duality, which represents a surprising one-to-one correspondence between methods efficiently minimizing function values and methods efficiently minimizing gradient magnitude. In continuous-time formulations, H-duality corresponds to reversing the time dependence of the dissipation/friction term. To the best of our knowledge, H-duality is different from Lagrange/Fenchel duality and is distinct from any previously known duality or symmetry relations. Using H-duality, we obtain a clearer understanding of the symmetry between Nesterov's method and OGM-G, derive a new class of methods efficiently reducing gradient magnitudes of smooth convex functions, and find a new composite minimization method that is simpler and faster than FISTA-G.

Keywords

Cite

@article{arxiv.2305.06628,
  title  = {Time-Reversed Dissipation Induces Duality Between Minimizing Gradient Norm and Function Value},
  author = {Jaeyeon Kim and Asuman Ozdaglar and Chanwoo Park and Ernest K. Ryu},
  journal= {arXiv preprint arXiv:2305.06628},
  year   = {2023}
}
R2 v1 2026-06-28T10:31:46.697Z