Efficient Continual Finite-Sum Minimization
Abstract
Given a sequence of functions with , finite-sum minimization seeks a point minimizing . In this work, we propose a key twist into the finite-sum minimization, dubbed as continual finite-sum minimization, that asks for a sequence of points such that each minimizes the prefix-sum . Assuming that each prefix-sum is strongly convex, we develop a first-order continual stochastic variance reduction gradient method () producing an -optimal sequence with overall first-order oracles (FO). An FO corresponds to the computation of a single gradient at a given for some . Our approach significantly improves upon the FOs that requires and the FOs that state-of-the-art variance reduction methods such as require. We also prove that there is no natural first-order method with gradient complexity for , establishing that the first-order complexity of our method is nearly tight.
Cite
@article{arxiv.2406.04731,
title = {Efficient Continual Finite-Sum Minimization},
author = {Ioannis Mavrothalassitis and Stratis Skoulakis and Leello Tadesse Dadi and Volkan Cevher},
journal= {arXiv preprint arXiv:2406.04731},
year = {2024}
}
Comments
Accepted in ICLR 2024, 35 pages