Efficient Swap Regret Minimization in Combinatorial Bandits
Abstract
This paper addresses the problem of designing efficient no-swap regret algorithms for combinatorial bandits, where the number of actions is exponentially large in the dimensionality of the problem. In this setting, designing efficient no-swap regret translates to sublinear -- in horizon -- swap regret with polylogarithmic dependence on . In contrast to the weaker notion of external regret minimization - a problem which is fairly well understood in the literature - achieving no-swap regret with a polylogarithmic dependence on has remained elusive in combinatorial bandits. Our paper resolves this challenge, by introducing a no-swap-regret learning algorithm with regret that scales polylogarithmically in and is tight for the class of combinatorial bandits. To ground our results, we also demonstrate how to implement the proposed algorithm efficiently -- that is, with a per-iteration complexity that also scales polylogarithmically in -- across a wide range of well-studied applications.
Keywords
Cite
@article{arxiv.2602.02087,
title = {Efficient Swap Regret Minimization in Combinatorial Bandits},
author = {Andreas Kontogiannis and Vasilis Pollatos and Panayotis Mertikopoulos and Ioannis Panageas},
journal= {arXiv preprint arXiv:2602.02087},
year = {2026}
}
Comments
Accepted at AISTATS 2026