1 / 16

Efficient Diversification II

Efficient Diversification II. Efficient Frontier with Risk-Free Asset Optimal Capital Allocation Line Single Factor Model. Eff. Frontier with Risk-Free Asset. With risky assets only No portfolio with zero variance GMVP has the lowest variance With a risk-free asset

gregwhite
Télécharger la présentation

Efficient Diversification II

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Efficient Diversification II Efficient Frontier with Risk-Free Asset Optimal Capital Allocation Line Single Factor Model

  2. Eff. Frontier with Risk-Free Asset • With risky assets only • No portfolio with zero variance • GMVP has the lowest variance • With a risk-free asset • Zero variance if investing in risk-free asset only • How does it change the efficient frontier?

  3. Optimal CAL • Mean-variance with two risky assets • w in security 1, 1 – w in security 2 • Expected return (Mean): • Variance • What happens when we add a risk-free asset? • A riskfree asset with rf= 5% • What is achievable now?

  4. E[r] CAL (P) M M P P CAL G F  P P&F M Eff. Frontier with Risk-Free Asset

  5. Eff. Frontier with Risk-Free Asset • CAL(P) dominates other lines • Best risk and return trade-off • Steepest slope • Portfolios along CAL(P) has the same highest Sharpe ratio • No portfolio with higher Sharpe ratio is achievable • Dominance independent of risk preference • How to find portfolio (P)?

  6. Optimal Portfolio • How much in each risky asset? • The expected return and standard dev. • Sharpe Ratio

  7. Eff. Frontier with Risk-Free Asset • What’s so special about portfolio (P)? • P is the market portfolio • Mutual fund theorem: An index mutual fund (market portfolio) and T-bills are sufficient for investors • Investors adjust the holding of index fund and T-bills according to their risk preferences

  8. Optimal Portfolio Allocation • Two Step Allocation • Step 1: Determine the optimal risky portfolio • Get the optimal mix of stock and bond • Optimal for all investors (market portfolio) • Step 2: Determine thebest complete portfolio • Obtain the best mix of the optimal risky portfolio and T-Bills • Different investors may have different best complete portfolios Investment Funds y 1-y P T-Bills w 1-w Bond Stock T - Bills Bond Stock 1 - yy×wy×(1 - w)

  9. Single Factor Model • Quantifies idiosyncratic versus systematic risk of a stock’s rate of return • Factor is a broad market index like S&P500 • The excess return is • : stock’s excess return above market performance • : stock’s return attributable to market performance • : return component from firm-specific unexpected event • Example: a statistical analysis between the excess returns of DELL and market shows that  = 4.5%,  = 1.4. If expected market excess return is 17%, what is the expected excess return for DELL? • Solution:

  10. Single Factor Model • Security Characteristic Line Dell Excess Returns (i) . Security Characteristic Line . . . . . . 28.3% . . . . . . . . . . . 23.8% . . . . . . . . . . ß = 1.4 . . . 4.5% . . . . . 17% Excess Returns on market index

  11. Single Factor Model • Meaning of Beta () • Indicator of how sensitive a security’s return is to changes in the return of the market portfolio. • A measure of the asset’s systematic risk. • Example: market portfolio’s risk premium is +10% during a given period, and  = 0%. •  = 1.50, the security’s risk premium will be +15%. •  = 1.00, the security’s risk premium will be +10% •  = 0.50, the security’s risk premium will be +5% •  = –0.50, the security’s risk premium will be–5%

  12. Single Factor Model • Beta coefficients for selected firms (March 2010) • Question: • What are the betas of market index and T-bills?

  13. Single Factor Model • Systematic Risk • Risk related to the macro factor or market index • Non-diversifiable/market risk • Unsystematic Risk • Risk related to company specific problems • Diversifiable/Firm-specific/Idiosyncratic risk • Total risk = Systematic + Unsystematic % of variance explained by the market

  14. Single Factor Model • Example • Given the following data on Microsoft, analyze the systematic risk, unsystematic risk and percentage of variance explained by systematic risk. (σi= 0.25, σM= 0.15, Cov[Ri,RM]=0.0315) • Solution

  15. Diversification in a Single Factor Security Market • A portfolio of three equally weighted assets 1, 2, and 3. • The excess return of the portfolio is • Risk of the portfolio is

  16. Wrap-up • What does the efficient frontier look like with the presence of a risk-free asset? • What are the two steps of asset allocation? • What is a single index model? • What are the meaning of systematic and unsystematic risks?

More Related