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Title: | Minimax Rates for Online Convex Optimization with Limited Decision Changes |
Authors: | Altschuler, Jason |
Advisors: | Hazan, Elad |
Department: | Computer Science |
Class Year: | 2016 |
Abstract: | Online convex optimization has rececently received substantial attention due to its elegant theory and many practical applications. It is well-known that when the player receives either fullinformation feedback or partial-information (bandit) feedback, the minimax rate for expected regret is Θ(√T), where T is the number of iterations in the game. However, real world constraints often limit the player from making many decision changes. We analyze the setting where the player is limited to S ≤ T switches between actions, and give a complete characterization of the minimax rate. When the player receives bandit feedback, we prove the minimax rate is Θ( ˜ T/√S) up to a logarithmic factor in T. When the player receives full-information feedback, the minimax rate is known to be Θ(√T) for S = Ω(√T); we complete the story by proving the minimax rate is Θ( TS) for S = O(√T). Our lower bound proofs are information theoretic in nature, whereas our upper bounds are shown by presenting algorithms which provably achieve the optimal minimax rate. |
Extent: | 25 pages |
URI: | http://arks.princeton.edu/ark:/88435/dsp01tm70mx606 |
Type of Material: | Princeton University Senior Theses |
Language: | en_US |
Appears in Collections: | Computer Science, 1988-2020 |
Files in This Item:
File | Size | Format | |
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Altschuler_Jason_thesis.pdf | 361.82 kB | Adobe PDF | Request a copy |
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