1. Paper Review:�A Benchmark Approach To Finance�Eckhard Platen�(Mathematical Finance, Vol. 16 No.1, 131-151) Zhao, Lu
The Mathematical and Computational Finance Lab
University of Calgary
October 24, 2006
2. Outline Introduction
Continuous Benchmark Model
More Rather Than Less
Expectation of Discounted GOP
Conclusion
3. 1.Introduction This paper derives a unified framework for portfolio optimization, derivatives pricing, financial modeling, and risk measurement.
General Assumption:
Investors prefer more rather than less, in the sense that given two portfolios with the same diffusion coefficient value, the one with the higher drift is preferred.
4. Characterizations of the Benchmark Approach:
1)Growth optimal portfolio (GOP) as a central building block;
2)Without use of expected utility functions in the capital asset pricing model;
3)Fair pricing concept, using the GOP as numeraire and the real-world probability measure as pricing measure.
5. 2. Continuous Benchmark Model 2.1 Primary Security Accounts
We consider a continuous financial market model that comprised d+1 primary security accounts. These include a savings account, which is a locally riskless primary security account whose value at time t is given by
6. They also include d nonnegative risky primary security account processes. The j-th primary security account value satisfies the following SDE:
where the k Wiener processes are independent.
7. Primary security accounts also follows the assumption:
8. This allows us to introduce the k-th market price for risk with respect to the k-th Wiener process:
and we can reswrite (2.2) in the form:
9. 2.2 Portfolios
We call a predictable stochastic process
a strategy (assumed to be self-financing), and denote by
the time t value of the portfolio process.
Let the portfolio process is nonzero. The j-th fraction of this portfolio is given by
10. By (2.6) and (2.10), we get for a nonzero portfolio value the SDE:
Where the k-th portfolio volatility and its appreciation rate are given by
11. If we define the discounted portfolio value in the form
then it satisfies
where the k-th portfolio diffusion coefficient is given by
12. Obviously, the discounted portfolio process has discounted drift
and its aggregate diffusion coefficient and aggregate volatility used to measure the trading uncertainty are given by
13. 2.3 Growth Optimal Portfolio
The GOP, which maximizes expected logarithmic utility from terminal wealth, plays a central role in finance theory.
If we apply the Ito formula for the strictly positive portfolio, we get
with portfolio growth rate
15. It is not hard to show that the GOP satisfies
16. 3. More Rather Than Less 3.1 Optimal Portfolios
17. Define the total market price for risk as
we have the following assumption:
18. An important investment characteristic is the Sharp ratio, defined as the ratio of the risk premium of the discounted portfolio
over its aggregate volatility, that is,
We have a nice Theorem of this ratio:
20. 3.2 Markowitz Efficient Frontier
21. 3.3 Capital Asset Pricing Model
22. 3.4 GOP and Market Portfolio
23. 3.5 Fair Pricing
26. 4. Expectation of Discounted GOP Let us rewrite (2.25) in the discounted form
where
27. Define the discounted GOP drift
we get the total market price for risk in the form
and obtain
This is a time transformed squared Bessel process of dimension four!
28. Its transformed time at time t is given by
Let us decompose the discounted GOP value at time t as
where
30. 6. Conclusion This paper identifies optimal portfolio as combinations of the market portfolio and the savings account;
The Markowitz efficient frontier and Sharpe ratio can be derived naturally;
The GOP equals a combination of the market portfolio and the savings account under the additional assumptions that the savings account is in net zero supply;
31. The discounted GOP can be modeled as a time transformed squared Bessel process of dimension four, which can be interpreted as its underlying value;
For the pricing of contigent claims the GOP is nominated as numeraire for fair pricing, with expectations to be taken under the real-world probability measure.
32. THE END�THANK YOU!
