English

Convex Q Learning in a Stochastic Environment: Extended Version

Optimization and Control 2023-09-12 v1 Machine Learning

Abstract

The paper introduces the first formulation of convex Q-learning for Markov decision processes with function approximation. The algorithms and theory rest on a relaxation of a dual of Manne's celebrated linear programming characterization of optimal control. The main contributions firstly concern properties of the relaxation, described as a deterministic convex program: we identify conditions for a bounded solution, and a significant relationship between the solution to the new convex program, and the solution to standard Q-learning. The second set of contributions concern algorithm design and analysis: (i) A direct model-free method for approximating the convex program for Q-learning shares properties with its ideal. In particular, a bounded solution is ensured subject to a simple property of the basis functions; (ii) The proposed algorithms are convergent and new techniques are introduced to obtain the rate of convergence in a mean-square sense; (iii) The approach can be generalized to a range of performance criteria, and it is found that variance can be reduced by considering ``relative'' dynamic programming equations; (iv) The theory is illustrated with an application to a classical inventory control problem.

Keywords

Cite

@article{arxiv.2309.05105,
  title  = {Convex Q Learning in a Stochastic Environment: Extended Version},
  author = {Fan Lu and Sean Meyn},
  journal= {arXiv preprint arXiv:2309.05105},
  year   = {2023}
}

Comments

Extended version of "Convex Q-learning in a stochastic environment", IEEE Conference on Decision and Control, 2023 (to appear)

R2 v1 2026-06-28T12:17:28.753Z