Autocorrelated Returns and Optimal Intertemporal Portfolio Choice

In recent years it has been shown empirically that stock returns exhibit positive or negative autocorrelation, depending on observation frequency. In this context of autocorrelated returns the present paper is the first to derive an explicit analytical solution to the dynamic portfolio problem of an individual agent saving for retirement or other change of status, like the purchase of a house or starting college. Using a normal ARMA1,1 process, dynamic programming techniques combined with the use of Stein's Lemma are employed to examine "dollar-cost-averaging" and "age effects" in intertemporal portfolio choice with CARA preferences. We show that with a positive moving average parameter and positive riskfree rates, if first-order serial correlation is nonnegative, then the expected value of the optimal risky investment is increasing over time, while if first-order serial correlation is negative this path can be increasing or decreasing over time. Thus a necessary but not sufficient condition to obtain the conventional age effect of increasing conservatism over time is that first-order serial correlation be negative. Further, dollar-cost averaging in the general sense of gradual entry into the risky asset does not emerge as an optimal policy. Simulation results for U.S. data are used to illustrate optimal portfolio paths.

[1]  A Note on the Suboptimality of Dollar-Cost Averaging as an Investment Policy , 1979 .

[2]  A. Lo,et al.  Stock Market Prices Do Not Follow Random Walks: Evidence from a Simple Specification Test , 1987 .

[3]  J. Mossin Optimal multiperiod portfolio policies , 1968 .

[4]  N. H. Hakansson. ON OPTIMAL MYOPIC PORTFOLIO POLICIES, WITH AND WITHOUT SERIAL CORRELATION OF YIELDS , 1971 .

[5]  R. Stambaugh,et al.  On the Predictability of Stock Returns: An Asset-Allocation Perspective , 1995 .

[6]  R. C. Merton,et al.  AN INTERTEMPORAL CAPITAL ASSET PRICING MODEL , 1973 .

[7]  P. Samuelson Asset allocation could be dangerous to your health , 1990 .

[8]  E. Fama,et al.  Permanent and Temporary Components of Stock Prices , 1988, Journal of Political Economy.

[9]  B. Mcdonald,et al.  Predicting Stock Returns in an Efficient Market , 1990 .

[10]  Serial Correlation of Asset Returns and Optimal Portfolios for the Long and Short Term , 1985 .

[11]  R. C. Merton,et al.  Optimum consumption and portfolio rules in a continuous - time model Journal of Economic Theory 3 , 1971 .

[12]  A. Lo,et al.  Implementing Option Pricing Models When Asset Returns are Predictable , 1994 .

[13]  Richard Startz,et al.  Mean Reversion in Stock Prices? a Reappraisal of the Empirical Evidence , 1988 .

[14]  R. C. Merton,et al.  Labor Supply Flexibility and Portfolio Choice in a Life-Cycle Model , 1992 .

[15]  M. Goldman Anti‐Diversification or Optimal Programmes for Infrequently Revised Portfolios , 1979 .

[16]  P A Samuelson A case at last for age-phased reduction in equity. , 1989, Proceedings of the National Academy of Sciences of the United States of America.

[17]  J. Poterba,et al.  Mean Reversion in Stock Prices: Evidence and Implications , 1987 .

[18]  C. Granger,et al.  Forecasting Economic Time Series. , 1988 .

[19]  Paul A. Samuelson,et al.  The judgment of economic science on rational portfolio management , 1989 .

[20]  Jack L. Treynor,et al.  Session Topic: Individual Investors and Mutual Funds: FROM THEORY TO A NEW FINANCIAL PRODUCT** , 1974 .