Optimal capital growth with convex shortfall penalties |
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| Authors: | Leonard C MacLean Yonggan Zhao William T Ziemba |
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| Institution: | 1. Rowe School of Business, Dalhousie University, 6100 University Avenue, Halifax, NS, B3H 3J5Canada.;2. School of Finance, Nanjing Audit University, Nanjing, China.;3. Sauder School of Business (Emeritus), University of British Columbia, Vancouver, BC, V6T 1Z2Canada.;4. Systemic Risk Centre, London School of Economics, London, WC2AUK. |
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| Abstract: | The optimal capital growth strategy or Kelly strategy has many desirable properties such as maximizing the asymptotic long-run growth of capital. However, it has considerable short-run risk since the utility is logarithmic, with essentially zero Arrow–Pratt risk aversion. It is common to control risk with a Value-at-Risk (VaR) constraint defined on the end of horizon wealth. A more effective approach is to impose a VaR constraint at each time on the wealth path. In this paper, we provide a method to obtain the maximum growth while staying above an ex-ante discrete time wealth path with high probability, where shortfalls below the path are penalized with a convex function of the shortfall. The effect of the path VaR condition and shortfall penalties is a lower growth rate than the Kelly strategy, but the downside risk is under control. The asset price dynamics are defined by a model with Markov transitions between several market regimes and geometric Brownian motion for prices within a regime. The stochastic investment model is reformulated as a deterministic programme which allows the calculation of the optimal constrained growth wagers at discrete points in time. |
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| Keywords: | Portfolio selection Capital growth Regime switching Convex penalty Value at risk |
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