Optimal execution with dynamic risk adjustment
Abstract
This paper considers the problem of optimal liquidation of a position in a risky security in a financial market, where price evolution are risky and trades have an impact on price as well as uncertainty in the filling orders. The problem is formulated as a continuous time stochastic optimal control problem aiming at maximizing a generalized risk-adjusted profit and loss function. The expression of the risk adjustment is derived from the general theory of dynamic risk measures and is selected in the class of -conditional risk measures. The resulting theoretical framework is nonclassical since the target function depends on backward components. We show that, under a quadratic specification of the driver of a backward stochastic differential equation, it is possible to find a closed form solution and an explicit expression of the optimal liquidation policies. In this way it is immediate to quantify the impact of risk-adjustment on the profit and loss and on the expression of the optimal liquidation policies.
Keywords
Cite
@article{arxiv.1901.00617,
title = {Optimal execution with dynamic risk adjustment},
author = {Xue Cheng and Marina Di Giacinto and Tai-Ho Wang},
journal= {arXiv preprint arXiv:1901.00617},
year = {2019}
}
Comments
34 pages, 2 figures