Reward-Weighted Regression Converges to a Global Optimum

Miroslav Strupl, Francesco Faccio, Dylan R. Ashley, Rupesh Kumar Srivastava, Jürgen Schmidhuber

AAAI 2022 pp. 8361-8369

doi:10.1609/AAAI.V36I8.20811 /aaai/2022/strupl2022aaai-reward/

Abstract

Reward-Weighted Regression (RWR) belongs to a family of widely known iterative Reinforcement Learning algorithms based on the Expectation-Maximization framework. In this family, learning at each iteration consists of sampling a batch of trajectories using the current policy and fitting a new policy to maximize a return-weighted log-likelihood of actions. Although RWR is known to yield monotonic improvement of the policy under certain circumstances, whether and under which conditions RWR converges to the optimal policy have remained open questions. In this paper, we provide for the first time a proof that RWR converges to a global optimum when no function approximation is used, in a general compact setting. Furthermore, for the simpler case with finite state and action spaces we prove R-linear convergence of the state-value function to the optimum.

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Cite

Text

Strupl et al. "Reward-Weighted Regression Converges to a Global Optimum." AAAI Conference on Artificial Intelligence, 2022. doi:10.1609/AAAI.V36I8.20811

Markdown

[Strupl et al. "Reward-Weighted Regression Converges to a Global Optimum." AAAI Conference on Artificial Intelligence, 2022.](https://mlanthology.org/aaai/2022/strupl2022aaai-reward/) doi:10.1609/AAAI.V36I8.20811

BibTeX

@inproceedings{strupl2022aaai-reward,
  title     = {{Reward-Weighted Regression Converges to a Global Optimum}},
  author    = {Strupl, Miroslav and Faccio, Francesco and Ashley, Dylan R. and Srivastava, Rupesh Kumar and Schmidhuber, Jürgen},
  booktitle = {AAAI Conference on Artificial Intelligence},
  year      = {2022},
  pages     = {8361-8369},
  doi       = {10.1609/AAAI.V36I8.20811},
  url       = {https://mlanthology.org/aaai/2022/strupl2022aaai-reward/}
}