A Statistical Analysis of Polyak-Ruppert Averaged Q-learning
Abstract
We study Q-learning with Polyak-Ruppert averaging in a discounted Markov decision process in synchronous and tabular settings. Under a Lipschitz condition, we establish a functional central limit theorem for the averaged iteration QT and show that its standardized partial-sum process converges weakly to a rescaled Brownian motion. The functional central limit theorem implies a fully online inference method for reinforcement learning. Furthermore, we show that QT is the regular asymptotically linear (RAL) estimator for the optimal Q-value function Q* that has the most efficient influence function. We present a nonasymptotic analysis for the ∞ error, E\|QT-Q*\|∞, showing that it matches the instance-dependent lower bound for polynomial step sizes. Similar results are provided for entropy-regularized Q-learning without the Lipschitz condition.
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