1 / 25

Chapter 9 – Multifactor Models of Risk and Return

Chapter 9 – Multifactor Models of Risk and Return. Questions to be answered: What is the arbitrage pricing theory (APT) and what are its similarities and differences relative to the CAPM? What are the major assumptions not required by the APT model compared to the CAPM?

trhoads
Download Presentation

Chapter 9 – Multifactor Models of Risk and Return

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. Chapter 9 – Multifactor Models of Risk and Return Questions to be answered: • What is the arbitrage pricing theory (APT) and what are its similarities and differences relative to the CAPM? • What are the major assumptions not required by the APT model compared to the CAPM? • How do you test the APT by examining anomalies found with the CAPM?

  2. Chapter 9 - Multifactor Models of Risk and Return • What are the empirical test results related to the APT? • Why do some authors contend that the APT model is untestable? • What are the concerns related to the multiple factors of the APT model?

  3. What are multifactor models and how are related to the APT? What are the steps necessary in developing a usable multifactor model? What are the multifactor models in practice? How is risk estimated in a multifactor setting? Chapter 9 - Multifactor Models of Risk and Return

  4. Arbitrage Pricing Theory (APT) • CAPM is criticized because of the difficulties in selecting a proxy for the market portfolio as a benchmark • An alternative pricing theory with fewer assumptions was developed: • Arbitrage Pricing Theory

  5. Arbitrage Pricing Theory - APT Three major assumptions: 1. Capital markets are perfectly competitive 2. Investors always prefer more wealth to less wealth with certainty 3. The stochastic process generating asset returns can be expressed as a linear function of a set of K factors or indexes

  6. Assumptions of CAPMThat Were Not Required by APT APT does not assume • A market portfolio that contains all risky assets, and is mean-variance efficient • Normally distributed security returns • Quadratic utility function

  7. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period Ri

  8. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period = expected return for asset i Ri Ei

  9. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period = expected return for asset i = reaction in asset i’s returns to movements in a common factor Ri Ei bik

  10. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period = expected return for asset i = reaction in asset i’s returns to movements in a common factor = a common factor with a zero mean that influences the returns on all assets Ri Ei bik

  11. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period = expected return for asset i = reaction in asset i’s returns to movements in a common factor = a common factor with a zero mean that influences the returns on all assets = a unique effect on asset i’s return that, by assumption, is completely diversifiable in large portfolios and has a mean of zero Ri Ei bik

  12. Arbitrage Pricing Theory (APT) For i = 1 to N where: = return on asset i during a specified time period = expected return for asset i = reaction in asset i’s returns to movements in a common factor = a common factor with a zero mean that influences the returns on all assets = a unique effect on asset i’s return that, by assumption, is completely diversifiable in large portfolios and has a mean of zero = number of assets Ri Ei bik N

  13. Arbitrage Pricing Theory (APT) Multiple factors expected to have an impact on all assets:

  14. Multiple factors expected to have an impact on all assets: Inflation Arbitrage Pricing Theory (APT)

  15. Multiple factors expected to have an impact on all assets: Inflation Growth in GNP Arbitrage Pricing Theory (APT)

  16. Multiple factors expected to have an impact on all assets: Inflation Growth in GNP Major political upheavals Arbitrage Pricing Theory (APT)

  17. Multiple factors expected to have an impact on all assets: Inflation Growth in GNP Major political upheavals Changes in interest rates Arbitrage Pricing Theory (APT)

  18. Multiple factors expected to have an impact on all assets: Inflation Growth in GNP Major political upheavals Changes in interest rates And many more…. Arbitrage Pricing Theory (APT)

  19. Multiple factors expected to have an impact on all assets: Inflation Growth in GNP Major political upheavals Changes in interest rates And many more…. Contrast with CAPM insistence that only beta is relevant Arbitrage Pricing Theory (APT)

  20. Bik determine how each asset reacts to this common factor Each asset may be affected by growth in GNP, but the effects will differ In application of the theory, the factors are not identified Similar to the CAPM, the unique effects are independent and will be diversified away in a large portfolio Arbitrage Pricing Theory (APT)

  21. APT assumes that, in equilibrium, the return on a zero-investment, zero-systematic-risk portfolio is zero when the unique effects are diversified away The expected return on any asset i (Ei) can be expressed as: Arbitrage Pricing Theory (APT)

  22. Arbitrage Pricing Theory (APT) where: = the expected return on an asset with zero systematic risk where = the risk premium related to each of the common factors - for example the risk premium related to interest rate risk bi = the pricing relationship between the risk premium and asset i - that is how responsive asset i is to this common factor K

  23. Example of Two Stocks and a Two-Factor Model = changes in the rate of inflation. The risk premium related to this factor is 1 percent for every 1 percent change in the rate = percent growth in real GNP. The average risk premium related to this factor is 2 percent for every 1 percent change in the rate = the rate of return on a zero-systematic-risk asset (zero beta: boj=0) is 3 percent

  24. Example of Two Stocks and a Two-Factor Model = the response of asset X to changes in the rate of inflation is 0.50 = the response of asset Y to changes in the rate of inflation is 2.00 = the response of asset X to changes in the growth rate of real GNP is 1.50 = the response of asset Y to changes in the growth rate of real GNP is 1.75

  25. Example of Two Stocks and a Two-Factor Model = .03 + (.01)bi1 + (.02)bi2 Ex = .03 + (.01)(0.50) + (.02)(1.50) = .065 = 6.5% Ey = .03 + (.01)(2.00) + (.02)(1.75) = .085 = 8.5%

More Related