Incremental cutting-plane method and its application
Abstract
We consider regularized cutting-plane methods to minimize a convex function that is the sum of a large number of component functions. One important example is the dual problem obtained from Lagrangian relaxation on a decomposable problem. In this paper, we focus on an incremental variant of the regularized cutting-plane methods, which only evaluates a subset of the component functions in each iteration. We first consider a limited-memory setup where the method deletes cuts after a finite number of iterations. The convergence properties of the limited-memory methods are studied under various conditions on regularization. We then provide numerical experiments where the incremental method is applied to the dual problems derived from large-scale unit commitment problems. In many settings, the incremental method is able to find a solution of high precision in a shorter time than the non-incremental method.
Cite
@article{arxiv.2110.12533,
title = {Incremental cutting-plane method and its application},
author = {Nagisa Sugishita and Andreas Grothey and Ken McKinnon},
journal= {arXiv preprint arXiv:2110.12533},
year = {2021}
}
Comments
15 pages, 1 figure