Session 5a Decision Models -- Prof. Juran.

Name: Session 5a Decision Models -- Prof. Juran.
Uploaded: 2017-12-22T22:19:07+00:00
Duration: PTM26S7
Description: Session 5a Decision Models -- Prof. Juran.

Session 5a Decision Models Prof. Juran

Decision Models -- Prof. Juran
Overview Portfolio Optimization Parametric Approach Array Functions Scenario Approach Put Options Shorting Decision Models Prof. Juran Decision Models Prof. Juran

4 Basic Matrix Operations
Sum Product Transpose Matrix Multiplication Inverting Matrices Decision Models Prof. Juran Decision Models Prof. Juran

Sum Product Decision Models Prof. Juran Decision Models Prof. Juran

Notes: r = i and c = j. In other words, the two matrices must have the same number of rows as each other and the same number of columns as each other. They do not need to be square matrices (where r = c and i = j). Decision Models Prof. Juran Decision Models Prof. Juran

1 2 3 4 5 6 7 8 A B C D 11 9 10 12 208 =SUMPRODUCT(A1:C2,A4:C5) Decision Models Prof. Juran Decision Models Prof. Juran

Transpose For matrix A, Decision Models Prof. Juran Decision Models Prof. Juran

Notes: If A is an r x c matrix, then must be a c x r matrix. A does not need to be a square matrix. Decision Models Prof. Juran Decision Models Prof. Juran

There is an Excel function for this purpose, called TRANSPOSE. This function is one of a special class of functions called array functions. In contrast with most other Excel functions, array functions have two important differences: They are entered into ranges of cells, not single cells You enter them by pressing Shift+Ctrl+Enter, not just Enter Decision Models Prof. Juran Decision Models Prof. Juran

Using the spreadsheet above as an example, we start by selecting the entire range A4:C6. Then type into the formula bar =TRANSPOSE(A1:C2) Press Shift+Ctrl+Enter, and curly brackets will appear round the formula (you can’t type them in). Decision Models Prof. Juran Decision Models Prof. Juran

Matrix Multiplication
For matrices A and B, Decision Models Prof. Juran Decision Models Prof. Juran

Inverting Matrices First, define a square matrix Ij as a matrix with j rows and j columns, completely filled with zeroes, except for ones on the diagonal: This special matrix is called the identity matrix. Decision Models Prof. Juran Decision Models Prof. Juran

Now, for a square matrix A with j rows and j columns, there may exist a matrix called A-inverse (symbolized ) such that: Not all square matrices can be inverted, a fact that has implications for regression analysis. Decision Models Prof. Juran Decision Models Prof. Juran

Remember: Select the entire range A5:B6 before typing the formula. Press Shift+Ctrl+Enter. Decision Models Prof. Juran Decision Models Prof. Juran

Parametric Approach Decision Models Prof. Juran Decision Models Prof. Juran

Parametric Approach The means are: μ = 0.14, μ = 0.11, μ = 0.10. 1 2 3 The variances are: 2 1 s = 0.20, 2 s = 0.08, 2 3 s = 0.18. The correlations are: ρ = 0.8, ρ = 0.7, and ρ = 0.9. 12 13 23 Decision Models Prof. Juran Decision Models Prof. Juran

Parametric Approach (a) Determine the minimum-variance portfolio that attains an expected annual return of at least 0.12, with no shorting of stocks allowed. (b) Draw the efficient frontier for portfolios composed of these three stocks. (c) Determine the minimum-variance portfolio that attains an expected annual return of at least 0.12, with shorting of stocks allowed. Decision Models Prof. Juran Decision Models Prof. Juran

Managerial Problem Definition
Decision Variables We need to allocate 100% of the available funds to the three stocks. Objective We want to minimize risk. Constraints The expected return on the portfolio must be at least 12% (or 0.12). All of the money must be invested. No shorting is allowed. Decision Models Prof. Juran Decision Models Prof. Juran

Formulation Decision Variables Define xi to be the proportion of the portfolio allocated to stock i. The decision variables are three proportions: x1, x2, and x3. Decision Models Prof. Juran Decision Models Prof. Juran

Formulation Decision Models Prof. Juran Decision Models Prof. Juran

Solution Methodology Decision Models Prof. Juran Decision Models Prof. Juran

Solution Methodology The decision variables are in B14:D14. Cell B18 keeps track of constraint (1). Cell E14 keeps track of constraint (2). We can comply with constraint (3) by selecting “assume nonnegative” in the Solver Options box. The range H8:J10 uses the HLOOKUP Excel function to calculate the covariances. Decision Models Prof. Juran Decision Models Prof. Juran

Solution Methodology Cell B20 uses two of Excel’s matrix functions, MMULT and TRANSPOSE, to calculate the portfolio variance. If you use these functions, you will want to learn more about working with “arrays” in Excel, an advanced topic beyond the scope of this course. In this case, you need to know not to type in the “curly brackets”; instead, type in the rest of the function and then Ctrl+Shift+Enter. The curly brackets will appear automatically. You will get a #VALUE! Error message if you do this wrong. Decision Models Prof. Juran Decision Models Prof. Juran

Optimal Solution Decision Models Prof. Juran Decision Models Prof. Juran

Optimal Solution The least risky way to invest these three stocks while having an expected return of at least 12% is to invest 33.3% in Stock 1 and 66.7% in Stock 2. This portfolio will have an expected return of 12% and a standard deviation of return of 32.1%. Decision Models Prof. Juran Decision Models Prof. Juran

Parametric Approach, cont.
(c) Determine the minimum-variance portfolio that attains an expected annual return of at least 0.12, with shorting of stocks allowed. All we need to do here is remove the nonnegativity constraint and re-run Solver. Decision Models Prof. Juran Decision Models Prof. Juran

Optimal Solution With shorting allowed, The least risky way to invest these three stocks while having an expected return of at least 12% is to sell Stock 3 short in an amount equivalent to 81.6% of the available funds, and invest 6.1% in Stock 1 and 175.4% in Stock 2. This portfolio will still have an expected return of 12%, but a standard deviation of return of only 25.7% (as opposed to 32.1% with no shorting allowed). Decision Models Prof. Juran Decision Models Prof. Juran

Juran’s Lazy Portfolio
Invest in Vanguard mutual funds under university retirement plan No shorting Max 8 mutual funds Rebalance once per year Tools used: Excel Solver Basic Stats (mean, stdev, correl, beta, crude version of CAPM) Decision Models Prof. Juran 36

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Scenario Approach Kate Torelli, a security analyst for Lion Fund, has identified a gold mining stock (ticker symbol GMS) as a particularly attractive investment. GMS is a highly leveraged company, so it is quite a risky investment by itself. She would therefore like to hedge the stock purchase — that is, reduce the risk of an investment in GMS stock. Decision Models Prof. Juran Decision Models Prof. Juran

Scenario Approach Currently GMS is trading at $100 per share. Torelli has constructed seven scenarios for the price of GMS stock one month from now. Decision Models Prof. Juran Decision Models Prof. Juran

Hedging with Put Options
Torelli called an options trader at a large investment bank for quotes. The prices for three (European-style) put options are shown. Torelli wishes to invest $10 million in GMS stock and put options. Decision Models Prof. Juran Decision Models Prof. Juran

Return on Investment Decision Models Prof. Juran Decision Models Prof. Juran

Modeling Put Options For a put option i, the return under any scenario j is given by: Where Ki is the strike price and Ci is the cost of the option. Decision Models Prof. Juran Decision Models Prof. Juran

Scenario Approach, cont.
Decision Models Prof. Juran Decision Models Prof. Juran

Example Let’s say Kate buys $7 million worth of GMS stock, and $1 million worth of each put option. This means that (x1, x2, x3, x4) = (7000, 1000, 1000, 1000). Under scenario 3, her return would be Decision Models Prof. Juran Decision Models Prof. Juran

Example, cont. Using the same procedure, it can be shown that for this particular allocation of assets, the seven scenarios would have returns as follows: Decision Models Prof. Juran Decision Models Prof. Juran

Example, cont. Therefore, the expected return on this particular allocation of assets is calculated as follows: å = 7 1 j P R R m 7 6 5 4 3 2 1 P R + = ( ) 05 . 11878 1 5670 2 538 3 2200 2300 900 500 + - = ( ) 594 567 108 660 460 90 25 + - = 132 - = Decision Models Prof. Juran Decision Models Prof. Juran

Example, cont. Finally, to calculate the standard deviation of the returns under this particular allocation of assets: ( ) å = - 7 1 2 j R P m R s ( ) 7 2 6 5 4 3 1 P R m - + = ( ) 05 . 132 11878 1 5670 2 538 3 2200 2300 900 500 - + = ( ) 05 . 12010 1 5802 2 406 3 2068 2168 768 632 + - = 937 , 211 7 307 366 3 962 32 565 283 1 449 940 054 59 942 19 + = 216 , 914 12 = 594 , 3 = Decision Models Prof. Juran Decision Models Prof. Juran

Example, cont. So, in English, if Kate buys $7 million worth of GMS stock, and $1 million worth of each put option, then her return on investment in dollar terms is a random variable with an expected value of about -$132,000 and a standard deviation of about $3,594,000. Decision Models Prof. Juran Decision Models Prof. Juran

GMS Case, cont. What is the expected return of GMS stock? What is the standard deviation of the return of GMS stock? Decision Models Prof. Juran Decision Models Prof. Juran

GMS Case, cont. Torelli suspects that a good strategy is to buy one put option A for each share of GMS stock purchased. What are the mean and standard deviation of return for this strategy? Decision Models Prof. Juran Decision Models Prof. Juran

GMS Case, cont. Assuming that Torelli's goal is to minimize the standard deviation of the portfolio return, what is the optimal portfolio that invests all $10 million? Decision Models Prof. Juran Decision Models Prof. Juran

Managerial Formulation
Decision Variables Torelli needs to invest $10 million in some combination of GMS stock and three types of put options. Objective Minimize risk (standard deviation of the portfolio’s return). Constraints All $10 million must be invested. No shorting. Decision Models Prof. Juran Decision Models Prof. Juran

Formulation Decision Models Prof. Juran Decision Models Prof. Juran

Solution Methodology Decision Models Prof. Juran Decision Models Prof. Juran

Optimal Solution Kate should buy $8,491,000 worth of GMS stock, and $1,509,000 worth of Put Option C. This portfolio will have an expected one-month return of $109,000 (1.09%) and a standard deviation of $795,000 (7.95%). Decision Models Prof. Juran Decision Models Prof. Juran

GMS Case, cont. Suppose that short selling is permitted -- that is, the nonnegativity restrictions on the portfolio weights are removed. Now what portfolio minimizes the standard deviation of return? Here we simply remove the nonnegativity constraint (by unchecking the box in the Solver Options that says “assume nonnegative”). Decision Models Prof. Juran Decision Models Prof. Juran

Optimal Solution Kate should buy $8,297,000 worth of stock and $2,376,000 worth of Put Option C, and she should short sell $8,000 worth of Put Option A and $665,000 worth of Put Option B. This portfolio will have an expected monthly return of 1.65% and a standard deviation of 7.18%. In other words, it will be more profitable and less risky than the portfolio without shorting. Decision Models Prof. Juran Decision Models Prof. Juran

Summary Portfolio Optimization Parametric Approach Array Functions Scenario Approach Put Options Shorting Decision Models Prof. Juran Decision Models Prof. Juran

Session 5a Decision Models -- Prof. Juran.

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