Saved in:
Bibliographic Details
Main Authors: Yokoyama, Ken, Ito, Shinji, Matsuoka, Tatsuya, Kimura, Kei, Yokoo, Makoto
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.17158
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866910424419532800
author Yokoyama, Ken
Ito, Shinji
Matsuoka, Tatsuya
Kimura, Kei
Yokoo, Makoto
author_facet Yokoyama, Ken
Ito, Shinji
Matsuoka, Tatsuya
Kimura, Kei
Yokoo, Makoto
contents An online decision-making problem is a learning problem in which a player repeatedly makes decisions in order to minimize the long-term loss. These problems that emerge in applications often have nonlinear combinatorial objective functions, and developing algorithms for such problems has attracted considerable attention. An existing general framework for dealing with such objective functions is the online submodular minimization. However, practical problems are often out of the scope of this framework, since the domain of a submodular function is limited to a subset of the unit hypercube. To manage this limitation of the existing framework, we in this paper introduce the online $\mathrm{L}^{\natural}$-convex minimization, where an $\mathrm{L}^{\natural}$-convex function generalizes a submodular function so that the domain is a subset of the integer lattice. We propose computationally efficient algorithms for the online $\mathrm{L}^{\natural}$-convex function minimization in two major settings: the full information and the bandit settings. We analyze the regrets of these algorithms and show in particular that our algorithm for the full information setting obtains a tight regret bound up to a constant factor. We also demonstrate several motivating examples that illustrate the usefulness of the online $\mathrm{L}^{\natural}$-convex minimization.
format Preprint
id arxiv_https___arxiv_org_abs_2404_17158
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Online $\mathrm{L}^{\natural}$-Convex Minimization
Yokoyama, Ken
Ito, Shinji
Matsuoka, Tatsuya
Kimura, Kei
Yokoo, Makoto
Machine Learning
An online decision-making problem is a learning problem in which a player repeatedly makes decisions in order to minimize the long-term loss. These problems that emerge in applications often have nonlinear combinatorial objective functions, and developing algorithms for such problems has attracted considerable attention. An existing general framework for dealing with such objective functions is the online submodular minimization. However, practical problems are often out of the scope of this framework, since the domain of a submodular function is limited to a subset of the unit hypercube. To manage this limitation of the existing framework, we in this paper introduce the online $\mathrm{L}^{\natural}$-convex minimization, where an $\mathrm{L}^{\natural}$-convex function generalizes a submodular function so that the domain is a subset of the integer lattice. We propose computationally efficient algorithms for the online $\mathrm{L}^{\natural}$-convex function minimization in two major settings: the full information and the bandit settings. We analyze the regrets of these algorithms and show in particular that our algorithm for the full information setting obtains a tight regret bound up to a constant factor. We also demonstrate several motivating examples that illustrate the usefulness of the online $\mathrm{L}^{\natural}$-convex minimization.
title Online $\mathrm{L}^{\natural}$-Convex Minimization
topic Machine Learning
url https://arxiv.org/abs/2404.17158