Comparison Between the Mean-Variance Optimal and the Mean-Quadratic-Variation Optimal Trading Strategies |
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| Authors: | S T Tse J S Kennedy H Windcliff |
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| Institution: | 1. David R. Cheriton School of Computer Science, University of Waterloo, Waterloo, ON N2L 3G1, Canadapaforsyt@uwaterloo.ca;3. Morgan Stanley, New York, NY 10036, USA |
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| Abstract: | ABSTRACTWe compare optimal liquidation policies in continuous time in the presence of trading impact using numerical solutions of Hamilton–Jacobi–Bellman (HJB) partial differential equations (PDEs). In particular, we compare the time-consistent mean-quadratic-variation strategy with the time-inconsistent (pre-commitment) mean-variance strategy. We show that the two different risk measures lead to very different strategies and liquidation profiles. In terms of the optimal trading velocities, the mean-quadratic-variation strategy is much less sensitive to changes in asset price and varies more smoothly. In terms of the liquidation profiles, the mean-variance strategy is much more variable, although the mean liquidation profiles for the two strategies are surprisingly similar. On a numerical note, we show that using an interpolation scheme along a parametric curve in conjunction with the semi-Lagrangian method results in significantly better accuracy than standard axis-aligned linear interpolation. We also demonstrate how a scaled computational grid can improve solution accuracy. |
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| Keywords: | Optimal trading mean variance pre-commitment mean quadratic variation time consistent arrival price implementation shortfall HJB PDE interpolation scaled grid |
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