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arxiv: 2409.04605 · v1 · pith:EBUHBL5S · submitted 2024-09-06 · cs.LG · cs.SY· eess.SY· stat.ML

Whittle Index Learning Algorithms for Restless Bandits with Constant Stepsizes

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classification cs.LG cs.SYeess.SYstat.ML
keywords indexlearningalgorithmq-learningapproximationconstantstepsizesrestless
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We study the Whittle index learning algorithm for restless multi-armed bandits. We consider index learning algorithm with Q-learning. We first present Q-learning algorithm with exploration policies -- epsilon-greedy, softmax, epsilon-softmax with constant stepsizes. We extend the study of Q-learning to index learning for single-armed restless bandit. The algorithm of index learning is two-timescale variant of stochastic approximation, on slower timescale we update index learning scheme and on faster timescale we update Q-learning assuming fixed index value. In Q-learning updates are in asynchronous manner. We study constant stepsizes two timescale stochastic approximation algorithm. We provide analysis of two-timescale stochastic approximation for index learning with constant stepsizes. Further, we present study on index learning with deep Q-network (DQN) learning and linear function approximation with state-aggregation method. We describe the performance of our algorithms using numerical examples. We have shown that index learning with Q learning, DQN and function approximations learns the Whittle index.

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