Accelerating Quantum Reinforcement Learning with a Quantum Natural Policy Gradient Based Approach

Abstract

We address the problem of quantum reinforcement learning (QRL) under model-free settings with quantum oracle access to the Markov Decision Process (MDP). This paper introduces a Quantum Natural Policy Gradient (QNPG) algorithm, which replaces the random sampling used in classical Natural Policy Gradient (NPG) estimators with a deterministic gradient estimation approach, enabling seamless integration into quantum systems. While this modification introduces a bounded bias in the estimator, the bias decays exponentially with increasing truncation levels. This paper demonstrates that the proposed QNPG algorithm achieves a sample complexity of O(ε-1.5) for queries to the quantum oracle, significantly improving the classical lower bound of O(ε-2) for queries to the MDP.