Regret analysis of stochastic and nonstochastic multi-armed bandit problems
著者
書誌事項
Regret analysis of stochastic and nonstochastic multi-armed bandit problems
(Foundations and trends in machine learning, v. 5,
now Publishers, c2012
大学図書館所蔵 件 / 全1件
-
該当する所蔵館はありません
- すべての絞り込み条件を解除する
注記
Includes bibliographical references (p. 117-127)
内容説明・目次
内容説明
A multi-armed bandit problem - or, simply, a bandit problem - is a sequential allocation problem defined by a set of actions. At each time step, a unit resource is allocated to an action and some observable payoff is obtained. The goal is to maximize the total payoff obtained in a sequence of allocations. The name bandit refers to the colloquial term for a slot machine (a ""one-armed bandit"" in American slang). In a casino, a sequential allocation problem is obtained when the player is facing many slot machines at once (a ""multi-armed bandit""), and must repeatedly choose where to insert the next coin.
Multi-armed bandit problems are the most basic examples of sequential decision problems with an exploration-exploitation trade-off. This is the balance between staying with the option that gave highest payoffs in the past and exploring new options that might give higher payoffs in the future. Although the study of bandit problems dates back to the 1930s, exploration-exploitation trade-offs arise in several modern applications, such as ad placement, website optimization, and packet routing. Mathematically, a multi-armed bandit is defined by the payoff process associated with each option.
In this book, the focus is on two extreme cases in which the analysis of regret is particularly simple and elegant: independent and identically distributed payoffs and adversarial payoffs. Besides the basic setting of finitely many actions, it also analyzes some of the most important variants and extensions, such as the contextual bandit model. This monograph is an ideal reference for students and researchers with an interest in bandit problems.
目次
1: Introduction 2: Stochastic bandits: fundamental results 3: Adversarial bandits: fundamental results 4: Contextual Bandits 5: Linear bandits 6: Nonlinear bandits 7: Variants. Acknowledgements. References
「Nielsen BookData」 より