English

Reinforcement Learning for Exponential Utility: Algorithms and Convergence in Discounted MDPs

Machine Learning 2026-05-11 v1

Abstract

Reinforcement learning (RL) for exponential-utility optimization in discounted Markov decision processes (MDPs) lacks principled value-based algorithms. We address this gap in the fixed risk-aversion setting. Building on the Bellman-type equation for exponential utility studied in \cite{porteus1975optimality}, we derive two Q-value-style extensions and show that the associated operators are contractions in the LL_\infty and sup-log/Thompson metrics, respectively. We characterize their fixed points and prove that the induced greedy stationary policy is optimal for the exponential-utility objective among stationary policies. These structural results lead to two model-free algorithms: a two-timescale Q-learning--style algorithm, for which we establish almost-sure convergence and provide finite-time convergence rates via timescale separation, and a one-timescale algorithm governed by a sublinear power-law operator. Since the latter does not admit a global contraction in standard metrics, we prove its convergence using delicate arguments based on local Lipschitzness, monotonicity, homogeneity, and Dini derivatives, and provide a scalar finite-time analysis that highlights the challenges in obtaining convergence rates in the vector case. Our work provides a foundation for value-based RL under exponential-utility objectives.

Keywords

Cite

@article{arxiv.2605.08053,
  title  = {Reinforcement Learning for Exponential Utility: Algorithms and Convergence in Discounted MDPs},
  author = {Gugan Thoppe and L. A. Prashanth and Ankur Naskar and Sanjay Bhat},
  journal= {arXiv preprint arXiv:2605.08053},
  year   = {2026}
}
R2 v1 2026-07-01T12:58:16.972Z