Download
1 / 25
250 likes | 259 Views
This article discusses optimal portfolio choice, covariance and correlation, risk and expected returns for portfolios, combining riskless and risky assets, risk aversion, utility function, choosing portfolios from many stocks, diversification, efficient set, optimal portfolio with borrowing and lending, efficient markets, and notions of market efficiency.
E N D
FINANCE9. Optimal Portfolio Choice Professor André Farber Solvay Business School Université Libre de Bruxelles Fall 2007
Introduction: random portfolios MBA 2007 Portfolio choice
Covariance and correlation • Statistical measures of the degree to which random variables movetogether • Covariance • Like variance figure, the covariance is in squared deviation units. • Not too friendly ... • Correlation • covariance divided by product of standard deviations • Covariance and correlation have the same sign • Positive :variables are positively correlated • Zero :variables are independant • Negative :variables are negatively correlated • The correlation is always between –1and +1 MBA 2007 Portfolio choice
Risk and expected returns for porfolios • In order to better understand the driving force explaining the benefitsfrom diversification, let us consider aportfolio of two stocks (A,B) • Characteristics: • Expected returns : • Standard deviations : • Covariance : • Portfolio: defined by fractions invested in each stockXA ,XBXA+ XB= 1 • Expected return on portfolio: • Variance of the portfolio's return: MBA 2007 Portfolio choice
Example • Invest $ 100 m in two stocks: • A $ 60 m XA = 0.6 • B $ 40 m XB = 0.4 • Characteristics (% per year) A B • • Expected return 20%15% • • Standard deviation 30%20% • Correlation 0.5 • Expected return = 0.6 × 20% + 0.4 × 15% = 18% • Variance = (0.6)²(.30)² + (0.4)²(.20)²+2(0.6)(0.4)(0.30)(0.20)(0.5) s²p = 0.0532 Standard deviation = 23.07 % • Less than the average of individual standard deviations: • 0.6 x0.30 + 0.4 x 0.20 = 26% MBA 2007 Portfolio choice
Combining the Riskless Asset and asingle Risky Asset • Consider the following portfolio P: • Fraction invested • in the riskless asset 1-x(40%) • in the risky asset x(60%) • Expected return on portfolio P: • Standard deviation of portfolio : MBA 2007 Portfolio choice
Relationship between expected return and risk • Combining the expressions obtained for : • the expected return • the standard deviation • leads to MBA 2007 Portfolio choice
Risk aversion • Risk aversion : • For agiven risk, investor prefers more expected return • For agiven expected return, investor prefers less risk Expected return Indifference curve Risk MBA 2007 Portfolio choice
Utility function • Mathematical representation of preferences • a: risk aversion coefficient • u=certainty equivalent risk-free rate • Example: a=2 • A6% 00.06 • B10% 10% 0.08 = 0.10 -2×(0.10)² • C15% 20% 0.07 =0.15 -2×(0.20)² • Bis preferred Utility MBA 2007 Portfolio choice
Optimal choice with asingle risky asset • Risk-free asset :RFProportion =1-x • Risky portfolio S:Proportion =x • Utility: • Optimum: • Solution: • Example: a=2 MBA 2007 Portfolio choice
Choosing portfolios from many stocks • Porfolio composition : • (X1, X2, ... ,Xi, ... ,XN) • X1 + X2+... +Xi+... +XN=1 • Expected return: • Risk: • Note: • Nterms for variances • N(N-1) terms for covariances • Covariances dominate MBA 2007 Portfolio choice
Some intuition MBA 2007 Portfolio choice
Example • Consider the risk of an equally weighted portfolio of N"identical« stocks: • Equally weighted: • Variance of portfolio: • If we increase the number of securities ?: • Variance of portfolio: MBA 2007 Portfolio choice
Diversification MBA 2007 Portfolio choice
The efficient set for many securities • Portfolio choice: choose anefficient portfolio • Efficient portfolios maximiseexpected return for a given risk • They are located on the upperboundary of the shaded region (each point in this regioncorrespond to a given portfolio) Expected Return Risk MBA 2007 Portfolio choice
Optimal portofolio with borrowing and lending M Optimal portfolio: maximize Sharpe ratio MBA 2007 Portfolio choice
Notions of Market Efficiency • An Efficient market is one in which: • Arbitrage is disallowed: rules out free lunches • Purchase or sale of a security at the prevailing market price is never a positive NPV transaction. • Prices reveal information • Three forms of Market Efficiency • (a) Weak Form Efficiency • Prices reflect all information in the past record of stock prices • (b) Semi-strong Form Efficiency • Prices reflect all publicly available information • (c) Strong-form Efficiency • Price reflect all information MBA 2007 Portfolio choice
Realization Expectation Efficient markets: intuition Price Price change is unexpected Time MBA 2007 Portfolio choice
Weak Form Efficiency • Random-walk model: • Pt -Pt-1 = Pt-1 * (Expected return) + Random error • Expected value (Random error) = 0 • Random error of period t unrelated to random component of any past period • Implication: • Expected value (Pt) = Pt-1 * (1 + Expected return) • Technical analysis: useless • Empirical evidence: serial correlation • Correlation coefficient between current return and some past return • Serial correlation = Cor (Rt, Rt-s) MBA 2007 Portfolio choice
Random walk - illustration MBA 2007 Portfolio choice
Semi-strong Form Efficiency • Prices reflect all publicly available information • Empirical evidence: Event studies • Test whether the release of information influences returns and when this influence takes place. • Abnormal return AR : ARt = Rt - Rmt • Cumulative abnormal return: • CARt = ARt0 + ARt0+1 + ARt0+2 +... + ARt0+1 MBA 2007 Portfolio choice
Strong-form Efficiency • How do professional portfolio managers perform? • Jensen 1969: Mutual funds do not generate abnormal returns • Rfund - Rf = + (RM - Rf) • Insider trading • Insiders do seem to generate abnormal returns • (should cover their information acquisition activities) MBA 2007 Portfolio choice
