Portfolio Optimization under Nonlinear Utility
Optimization and Control
2015-04-16 v1
Abstract
This paper studies the utility maximization problem of an agent with non-trivial endowment, and whose preferences are modeled by the maximal subsolution of a BSDE. We prove existence of an optimal trading strategy and relate our existence result to the existence of a maximal subsolution to a controlled decoupled FBSDE. Using BSDE duality, we show that the utility maximization problem can be seen as a robust control problem admitting a saddle point if the generator of the BSDE additionally satisfies a specific growth condition. We show by convex duality that any saddle point of the robust control problem agrees with a primal and a dual optimizer of the utility maximization problem, and can be characterized in terms of a BSDE solution.
Cite
@article{arxiv.1504.03931,
title = {Portfolio Optimization under Nonlinear Utility},
author = {Gregor Heyne and Michael Kupper and Ludovic Tangpi},
journal= {arXiv preprint arXiv:1504.03931},
year = {2015}
}