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arxiv: 2405.19697 · v2 · pith:U2IH23NNnew · submitted 2024-05-30 · 🧮 math.OC · cs.AI· cs.LG· stat.ML

Bilevel reinforcement learning via the development of hyper-gradient without lower-level convexity

classification 🧮 math.OC cs.AIcs.LGstat.ML
keywords bilevelhyper-gradientlearninglower-levelreinforcementalgorithmsconvexitydevelopment
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Bilevel reinforcement learning (RL), which features intertwined two-level problems, has attracted growing interest recently. The inherent non-convexity of the lower-level RL problem is, however, to be an impediment to developing bilevel optimization methods. By employing the fixed point equation associated with the regularized RL, we characterize the hyper-gradient via fully first-order information, thus circumventing the assumption of lower-level convexity. This, remarkably, distinguishes our development of hyper-gradient from the general AID-based bilevel frameworks since we take advantage of the specific structure of RL problems. Moreover, we design both model-based and model-free bilevel reinforcement learning algorithms, facilitated by access to the fully first-order hyper-gradient. Both algorithms enjoy the convergence rate $O(\epsilon^{-1})$. To extend the applicability, a stochastic version of the model-free algorithm is proposed, along with results on its iteration and sample complexity. In addition, numerical experiments demonstrate that the hyper-gradient indeed serves as an integration of exploitation and exploration.

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