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CHAPTER 7&8. Optimal portfolios and index model. Diversification and Portfolio Risk. Suppose your portfolio has only 1 stock, how many sources of risk can affect your portfolio? Uncertainty at the market level Uncertainty at the firm level Market risk Systematic or Nondiversifiable
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CHAPTER 7&8 Optimal portfolios and index model
Diversification and Portfolio Risk • Suppose your portfolio has only 1 stock, how many sources of risk can affect your portfolio? • Uncertainty at the market level • Uncertainty at the firm level • Market risk • Systematic or Nondiversifiable • Firm-specific risk • Diversifiable or nonsystematic • If your portfolio is not diversified, the total risk of portfolio will have both market risk and specific risk • If it is diversified, the total risk has only market risk
Figure 6.1 Portfolio Risk as a Function of the Number of Stocks
Covariance and Correlation • Why the std (total risk) decreases when more stocks are added to the portfolio? • The std of a portfolio depends on both standard deviation of each stock in the portfolio and the correlation between them • Example: return distribution of stock and bond, and a portfolio consists of 60% stock and 40% bond state Prob. stock (%) Bond (%) Portfolio Recession 0.3 -11 16 Normal 0.4 13 6 Boom 0.3 27 -4
Covariance and Correlation • What is the E(rs) and σs? • What is the E(rb) and σb? • What is the E(rp) and σp? • E(r) σ Bond 6 7.75 Stock 10 14.92 Portfolio 8.4 5.92
Covariance and Correlation • When combining the stocks into the portfolio, you get the average return but the std is less than the average of the std of the 2 stocks in the portfolio • Why? • The risk of a portfolio also depends on the correlation between 2 stocks • How to measure the correlation between the 2 stocks • Covariance and correlation
Covariance and Correlation • Prob rs E(rs) rb E(rb) P(rs- E(rs))(rb- E(rb)) 0.3 -11 10 16 6 -63 0.4 13 10 6 6 0 0.3 27 10 -4 6 -51 • Cov (rs, rb) = -114 • The covariance tells the direction of the relationship between the 2 assets, but it does not tell the whether the relationship is weak or strong • Corr(rs, rb) = Cov (rs, rb)/ σs σb = -114/(14.92*7.75) = -0.99
Covariance and Correlation Portfolio risk depends on the correlation between the returns of the assets in the portfolio Covariance and the correlation coefficient provide a measure of the way returns two assets vary
Two-Security Portfolio: Risk = Variance of Security D = Variance of Security E = Covariance of returns for Security D and Security E
Two-Security Portfolio: Risk Continued Another way to express variance of the portfolio:
Covariance Cov(rD,rE) = DEDE D,E = Correlation coefficient of returns D = Standard deviation of returns for Security D E = Standard deviation of returns for Security E
Correlation Coefficients: Possible Values Range of values for 1,2 + 1.0 >r> -1.0 If r = 1.0, the securities would be perfectly positively correlated If r = - 1.0, the securities would be perfectly negatively correlated
Three-Security Portfolio 2p = w1212 + w2212 + w3232 + 2w1w2 Cov(r1,r2) Cov(r1,r3) + 2w1w3 + 2w2w3 Cov(r2,r3)
Table 7.2 Computation of Portfolio Variance From the Covariance Matrix
Table 7.3 Expected Return and Standard Deviation with Various Correlation Coefficients
Figure 7.3 Portfolio Expected Return as a Function of Investment Proportions
Figure 7.4 Portfolio Standard Deviation as a Function of Investment Proportions
Minimum Variance Portfolio as Depicted in Figure 7.4 Standard deviation is smaller than that of either of the individual component assets Figure 7.3 and 7.4 combined demonstrate the relationship between portfolio risk
Figure 7.5 Portfolio Expected Return as a Function of Standard Deviation
The relationship depends on the correlation coefficient -1.0 << +1.0 The smaller the correlation, the greater the risk reduction potential If r = +1.0, no risk reduction is possible Correlation Effects
Figure 7.6 The Opportunity Set of the Debt and Equity Funds and Two Feasible CALs
The Sharpe Ratio Maximize the slope of the CAL for any possible portfolio, p The objective function is the slope:
Optimal portfolio P The solution of the optimal portfolio is as follows
Figure 7.7 The Opportunity Set of the Debt and Equity Funds with the Optimal CAL and the Optimal Risky Portfolio
Figure 7.9 The Proportions of the Optimal Overall Portfolio An investor with risk-aversion coefficient A = 4 would take a position in a portfolio P The investor will invest 74.39% of wealth in portfolio P, 25.61% in T-bill. Portfolio P consists of 40% in bonds and 60% in stock, therefore, the percentage of wealth in stock =0.7349*0.6=44.63%, in bond = 0.7349*0.4=29.76%
Markowitz Portfolio Selection Model • Security Selection • First step is to determine the risk-return opportunities available • All portfolios that lie on the minimum-variance frontier from the global minimum-variance portfolio and upward provide the best risk-return combinations
Markowitz Portfolio Selection Model Continued We now search for the CAL with the highest reward-to-variability ratio
Figure 7.11 The Efficient Frontier of Risky Assets with the Optimal CAL
Markowitz Portfolio Selection Model Continued Now the individual chooses the appropriate mix between the optimal risky portfolio P and T-bills as in Figure 7.8
Capital Allocation and the Separation Property • The separation property tells us that the portfolio choice problem may be separated into two independent tasks • Determination of the optimal risky portfolio is purely technical • Allocation of the complete portfolio to T-bills versus the risky portfolio depends on personal preference
Figure 7.13 Capital Allocation Lines with Various Portfolios from the Efficient Set
The Power of Diversification • Remember: • If we define the average variance and average covariance of the securities as: • We can then express portfolio variance as:
Table 7.4 Risk Reduction of Equally Weighted Portfolios in Correlated and Uncorrelated Universes
Disadvantages of the efficient frontier approach • The efficient frontier was introduced by Markowitz (1952) and later earned him a Nobel prize in 1990. • However, the approach involved too many inputs, calculations • If a portfolio includes only 2 stocks, to calculate the variance of the portfolio, how many variance and covariance you need? • If a portfolio includes only 3 stocks, to calculate the variance of the portfolio, how many variance and covariance you need? • If a portfolio includes only n stocks, to calculate the variance of the portfolio, how many variance and covariance you need? • n variances • n(n-1)/2 covariances
Single-Index Model Continued • Risk and covariance: • Total risk = Systematic risk + Firm-specific risk: • Covariance = product of betas x market index risk: • Correlation = product of correlations with the market index
Index Model and Diversification • Portfolio’s variance: • Variance of the equally weighted portfolio of firm-specific components: • When n gets large, becomes negligible
Figure 8.1 The Variance of an Equally Weighted Portfolio with Risk Coefficient βp in the Single-Factor Economy
Single index model When we diversify, all the specific risk will go away, the only risk left is systematic risk component Now, all we need is to estimate beta1, beta2, ...., beta n, and the variance of the market. No need to calculate n variance, n(n-1)/2 covariances as before
Estimate beta • Run a linear regression according to the index model, the slope is the beta • For simplicity, we assume beta is the measure for market risk • Beta = 0 • Beta = 1 • Beta > 1 • Beta < 1
Figure 8.2 Excess Returns on HP and S&P 500 April 2001 – March 2006
Figure 8.3 Scatter Diagram of HP, the S&P 500, and the Security Characteristic Line (SCL) for HP
Table 8.1 Excel Output: Regression Statistics for the SCL of Hewlett-Packard
