Perov's Contraction Principle and Dynamic Programming with Stochastic Discounting
Theoretical Economics
2021-09-10 v2 Functional Analysis
Optimization and Control
Abstract
This paper shows the usefulness of Perov's contraction principle, which generalizes Banach's contraction principle to a vector-valued metric, for studying dynamic programming problems in which the discount factor can be stochastic. The discounting condition is replaced by , where is an appropriate nonnegative matrix and denotes the spectral radius. Blackwell's sufficient condition is also generalized in this setting. Applications to asset pricing and optimal savings are discussed.
Cite
@article{arxiv.2103.14173,
title = {Perov's Contraction Principle and Dynamic Programming with Stochastic Discounting},
author = {Alexis Akira Toda},
journal= {arXiv preprint arXiv:2103.14173},
year = {2021}
}