DP12737 Liquidity Regimes and Optimal Dynamic Asset Allocation
|Author(s):||Pierre Collin-Dufresne, Kent Daniel, Mehmet Saglam|
|Publication Date:||February 2018|
|Keyword(s):||dynamic portfolio choice, mean-variance, price impact, risk-parity, stochastic volatility, transaction costs|
|JEL(s):||D53, G11, G12|
|Programme Areas:||Financial Economics|
|Link to this Page:||cepr.org/active/publications/discussion_papers/dp.php?dpno=12737|
We solve for the optimal dynamic asset allocation when expected returns, volatilities, and trading costs follow a regime switching model. The optimal policy is to trade partially towards an aim portfolio with a given trading speed. In a given state, the aim portfolio is a weighted average of mean-variance portfolios in every state, where the weight is a function of the probability of transitioning to that state, and the state's persistence, risk and trading costs. The trading speed is higher in states that are more persistent, where return volatility is higher and trading costs are lower. It can be optimal to deviate substantially from the mean-variance efficient portfolio (or from the risk-parity allocation) and to underweight high Sharpe ratio (high volatility) assets, as well as to trade more aggressively the less liquid assets in anticipation of an increase in their volatility and trading costs. We illustrate our approach in an empirical exercise in which we exploit time-variation in the expected return, volatility, and cost of trading of the value-weighted market portfolio of US common stocks. We estimate a regime switching model applied to a dataset of institutional trades, and find that realized trading costs are significantly higher when market volatility is high. The optimal dynamic strategy significantly outperforms a myopic trading strategy in an out-of-sample experiment. The highest gains arise from timing the changes in volatility and trading costs rather than expected returns.