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Discrete-time portfolio optimization under maximum drawdown constraint with partial information and deep learning resolution

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  • Carmine De Franco
  • Johann Nicolle
  • Huy^en Pham

Abstract

We study a discrete-time portfolio selection problem with partial information and maxi\-mum drawdown constraint. Drift uncertainty in the multidimensional framework is modeled by a prior probability distribution. In this Bayesian framework, we derive the dynamic programming equation using an appropriate change of measure, and obtain semi-explicit results in the Gaussian case. The latter case, with a CRRA utility function is completely solved numerically using recent deep learning techniques for stochastic optimal control problems. We emphasize the informative value of the learning strategy versus the non-learning one by providing empirical performance and sensitivity analysis with respect to the uncertainty of the drift. Furthermore, we show numerical evidence of the close relationship between the non-learning strategy and a no short-sale constrained Merton problem, by illustrating the convergence of the former towards the latter as the maximum drawdown constraint vanishes.

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  • Carmine De Franco & Johann Nicolle & Huy^en Pham, 2020. "Discrete-time portfolio optimization under maximum drawdown constraint with partial information and deep learning resolution," Papers 2010.15779, arXiv.org, revised Oct 2020.
    • Handle: RePEc:arx:papers:2010.15779
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    1. Alexis Bismuth & Olivier Gu'eant & Jiang Pu, 2016. "Portfolio choice, portfolio liquidation, and portfolio transition under drift uncertainty," Papers 1611.07843, arXiv.org, revised Mar 2019.
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