Lagrangian-based methods in convex optimization: prediction-correction frameworks with non-ergodic convergence rates
Optimization and Control
2023-04-06 v1
Abstract
Lagrangian-based methods are classical methods for solving convex optimization problems with equality constraints. We present novel prediction-correction frameworks for such methods and their variants, which can achieve non-ergodic convergence rates for general convex optimization and non-ergodic convergence rates under the assumption that the objective function is strongly convex or gradient Lipschitz continuous. We give two approaches ( ) to design algorithms satisfying the presented prediction-correction frameworks. As applications, we establish non-ergodic convergence rates for some well-known Lagrangian-based methods (esp., the ADMM type methods and the multi-block ADMM type methods).
Cite
@article{arxiv.2304.02459,
title = {Lagrangian-based methods in convex optimization: prediction-correction frameworks with non-ergodic convergence rates},
author = {Tao Zhang and Yong Xia and Shiru Li},
journal= {arXiv preprint arXiv:2304.02459},
year = {2023}
}