English

Bayesian learning for the Markowitz portfolio selection problem

Portfolio Management 2018-11-19 v1 Optimization and Control Computational Finance

Abstract

We study the Markowitz portfolio selection problem with unknown drift vector in the multidimensional framework. The prior belief on the uncertain expected rate of return is modeled by an arbitrary probability law, and a Bayesian approach from filtering theory is used to learn the posterior distribution about the drift given the observed market data of the assets. The Bayesian Markowitz problem is then embedded into an auxiliary standard control problem that we characterize by a dynamic programming method and prove the existence and uniqueness of a smooth solution to the related semi-linear partial differential equation (PDE). The optimal Markowitz portfolio strategy is explicitly computed in the case of a Gaussian prior distribution. Finally, we measure the quantitative impact of learning, updating the strategy from observed data, compared to non-learning, using a constant drift in an uncertain context, and analyze the sensitivity of the value of information w.r.t. various relevant parameters of our model.

Keywords

Cite

@article{arxiv.1811.06893,
  title  = {Bayesian learning for the Markowitz portfolio selection problem},
  author = {Carmine De Franco and Johann Nicolle and Huyên Pham},
  journal= {arXiv preprint arXiv:1811.06893},
  year   = {2018}
}
R2 v1 2026-06-23T05:18:21.347Z