Impulse control maximising average cost per unit time: a non-uniformly ergodic case
Optimization and Control
2024-02-06 v2
Abstract
This paper studies maximisation of an average-cost-per-unit-time ergodic functional over impulse strategies controlling a Feller-Markov process. The uncontrolled process is assumed to be ergodic but, unlike the extant literature, the convergence to invariant measure does not have to be uniformly geometric in total variation norm; in particular, we allow for non-uniform geometric or polynomial convergence. Cost of an impulse may be unbounded, e.g., proportional to the distance the process is shifted. We show that the optimal value does not depend on the initial state and provide optimal or -optimal strategies.
Keywords
Cite
@article{arxiv.1606.08731,
title = {Impulse control maximising average cost per unit time: a non-uniformly ergodic case},
author = {Jan Palczewski and Lukasz Stettner},
journal= {arXiv preprint arXiv:1606.08731},
year = {2024}
}
Comments
25 pages; This is an updated version after spinning off two sections of the paper as a basis for arxiv:1607.06018