Efficient Online Learning for Dynamic k-Clustering
Abstract
We study dynamic clustering problems from the perspective of online learning. We consider an online learning problem, called \textit{Dynamic -Clustering}, in which centers are maintained in a metric space over time (centers may change positions) such as a dynamically changing set of clients is served in the best possible way. The connection cost at round is given by the \textit{-norm} of the vector consisting of the distance of each client to its closest center at round , for some or . We present a \textit{-regret} polynomial-time online learning algorithm and show that, under some well-established computational complexity conjectures, \textit{constant-regret} cannot be achieved in polynomial-time. In addition to the efficient solution of Dynamic -Clustering, our work contributes to the long line of research on combinatorial online learning.
Cite
@article{arxiv.2106.04336,
title = {Efficient Online Learning for Dynamic k-Clustering},
author = {Dimitris Fotakis and Georgios Piliouras and Stratis Skoulakis},
journal= {arXiv preprint arXiv:2106.04336},
year = {2021}
}