English

Operator-Theoretic Foundations and Policy Gradient Methods for General MDPs with Unbounded Costs

Machine Learning 2026-04-01 v3 Optimization and Control

Abstract

Markov decision processes (MDPs) is viewed as an optimization of an objective function over certain linear operators over general function spaces. A new existence result is established for the existence of optimal policies in general MDPs, which differs from the existence result derived previously in the literature. Using the well-established perturbation theory of linear operators, policy difference lemma is established for general MDPs and the Gauteaux derivative of the objective function as a function of the policy operator is derived. By upper bounding the policy difference via the theory of integral probability metric, a new majorization-minimization type policy gradient algorithm for general MDPs is derived. This leads to generalization of many well-known algorithms in reinforcement learning to cases with general state and action spaces. Further, by taking the integral probability metric as maximum mean discrepancy, a low-complexity policy gradient algorithm is derived for finite MDPs. The new algorithm, called MM-RKHS, appears to be superior to PPO algorithm due to low computational complexity, low sample complexity, and faster convergence.

Keywords

Cite

@article{arxiv.2603.17875,
  title  = {Operator-Theoretic Foundations and Policy Gradient Methods for General MDPs with Unbounded Costs},
  author = {Abhishek Gupta and Aditya Mahajan},
  journal= {arXiv preprint arXiv:2603.17875},
  year   = {2026}
}
R2 v1 2026-07-01T11:26:28.220Z