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More on Asset Allocation

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Title: More on Asset Allocation


1
More on Asset Allocation
  • Week 5

2
Minimum Variance and Efficient Frontier
  • When we only have two risky assets, as in our KO
    PEP example, it is easy to construct this graph
    by simply calculating the portfolio returns for
    all possible weights.
  • When we have more than 2 assets, it becomes more
    difficult to represent all possible portfolios,
    and instead we will only graph only a subset of
    portfolios. Here, we will choose only those
    portfolios that have the minimum volatility for a
    given return. We will call this graph the minimum
    variance frontier.
  • The upper half of the minimum variance frontier
    is called the efficient frontier. The optimal
    portfolio is one of the portfolios on the
    efficient frontier.
  • The next few slides describes how this frontier
    can be created.
  • Once the frontier is created, we can find the
    portfolio with the highest Sharpe ratio by

3
Creating the minimum variance frontier
  • How to use a spreadsheet to calculate the
    frontier when there are more than 2 assets

4
The Minimum Variance Frontier
  • With two assets, as we saw, we can construct the
    frontier by brute force - by listing almost all
    possible portfolios.
  • When we have more than 2 assets, its gets
    difficult to consider all possible portfolio
    combinations. Instead, we will make the process
    simpler by considering only a subset of
    portfolios those portfolios that have the
    minimum volatility for a given return.
  • When we plot the return and volatilities of these
    portfolios, the resultant graph will be known as
    the minimum variance (or volatility) frontier.
  • We will use Excels Solver for these
    calculations (look under Tools. If it is not
    there, then add it into the menu through Add-in).

5
The Steps
  • We will implement the procedure in three steps
  • 1. For each asset (and for the time period that
    you have chosen), calculate the mean return,
    volatility and the correlation matrix.
  • 2. Set up the spreadsheet so that the Solver can
    be used. See the sample spreadsheet. Your
    objective here is to determine the weights of the
    portfolio that will allow you to achieve a
    specified required rate of return with the lowest
    possible volatility.
  • 3. Repeat 2 for a range of returns, and plot the
    frontier (return vs. volatility).

6
Step 1 Assembling the Data
  • A. Fix the time period for the analysis. You want
    a sufficiently long period so that your estimates
    of the mean return, volatility and correlation
    are accurate. But you also dont want too long a
    period as very old data may not be valid.
  • B. Estimate the mean return and volatility for
    each of your assets. Next, calculate the
    correlation between each pair of assets. If there
    are N assets, you will have to calculate N(N-1)/2
    correlations.

7
Step 2 Setting up the spreadsheet to use the
Solver (1/4)
  • The objective here is to set up the spreadsheet
    in a manner that is easy to use with the solver.
  • The estimates of the return, volatility and the
    correlation matrix are used to set up a matrix
    for covariances, which is then used to calculate
    the portfolio volatility for a given set of
    weights.
  • To create the frontier, you will ask the solver
    to find you the weights that gives you the
    minimum volatility for a required return.

8
Step 2 Using the Solver (2/4)
  • 1.Target Cell When you call the solver, it will
    ask you to specify the objective or the target
    cell. Your objective is to minimize the
    volatility - so in this case, you will specify
    the cell that calculates the portfolio variance
    B36. As you want to minimize the variance,
    you click the Min.
  • 2. Constraints You will have to specify the
    constraints under which the optimization must
    work. There are two constraints that hold, and a
    third which will usually also apply.

9
Using the Solver Constraints on the Optimization
(3/4)
  • 1. First, the sum of the weights must add up to
    1.
  • 2. Second, you have to specify the required rate
    of return for which you want the portfolio of
    least volatility. For each level of return, you
    will solve for the weights that give you the
    minimum volatility. To construct the frontier,
    you will vary this required return over a range.
    Thus, you will have to change this constraint
    every time you change the required return.
  • Third, if you want to impose a short-selling
    constraint, you can specify that each portfolio
    weight is positive.

10
Step 2 (4/4)
  • Finally, you specify the arguments that need to
    be optimized. In this case, you are searching for
    the optimal weights, so you will have to specify
    the range in the spreadsheet where the portfolio
    weights used A29 to A34.

11
Step 3
  • The final step is to simply repeat step 2, until
    you have a sufficiently large data set so that
    the minimum variance frontier can be plotted.
  • .

12
The Optimal Allocation
  • We can now use the graph of the minimum variance
    frontier to figure out the portfolio with the
    highest Sharpe Ratio. This portfolio will be the
    portfolio such that the CAL passing through it is
    tangent to the minimum variance frontier.
  • The weights of this portfolio determines the
    optimal allocation within the assets that make up
    the risky portfolio. All investors should opt
    for this allocation.
  • The portfolio will always be on the upper portion
    of the frontier, above the portfolio with the
    lowest volatility - this portion is called the
    efficient frontier.

13
Example
  • The spreadsheet MinimumVarianceFrontier
    provides an example of the computation of the
    minimum variance frontier for a portfolio of 6
    stocks KO, PEP, WMT, IBM, XOM, MSFT.
  • The optimal portfolio turns out to have the
    following weights 13 in WMT, 3.50 in IBM, 68
    in XOM, and 15.50 in MSFT. This portfolio had an
    average return of 23, and a volatility of
    15.45.
  • The return and volatility of SP 500 are also
    plotted on the graph for comparison.

14
Minimum Variance Frontier
15
The Sharpe Ratio for the Portfolios
16
The Optimal Portfolio vs. SP 500
  • In our example, the optimal portfolio provides a
    risk-return tradeoff far superior to investing in
    the SP 500.
  • For example, if we invest 48.8 in the optimal
    portfolio and the remainder in the Treasury Bill,
    we would expect to earn a return equal to that of
    the SP 500 (of 12.14), but with a volatility of
    7.50, far lower than the SP 500 volatility of
    28.
  • On the other hand, if we leverage up (borrowing
    at the risk-free rate) to make the volatility of
    the optimal portfolio equal to the volatility of
    SP 500, we would expect to earn a return of
    38.25, much higher than the SP 500 return of
    12.14.

17
In Summary (1/2)
  • 1. The optimal allocation is determined in two
    steps. First, we decide the allocation between
    the risky portfolio, and the riskless asset.
    Second, we determine the allocation between the
    assets that comprise the risky portfolio.
  • 2. As every portfolio of the risky assets and the
    riskless asset has the same Sharpe ratio, there
    is not one optimal portfolio for all investors.
    Instead, the allocation will be determined by
    individual-specific factors like risk aversion
    and the objectives of the investor, taking into
    account factors like the investors horizon,
    wealth, etc.
  • 3. When we are considering the allocation between
    different classes of risky assets, it is possible
    to create a portfolio that has the highest Sharpe
    Ratio. The weights of the risky assets in this
    portfolio will determine the optimal allocation
    between various risky assets. This portfolio can
    be determined graphically by drawing the capital
    allocation line (CAL) such that it is tangent to
    the minimum variance frontier. This portfolio
    will always lie on the upper part of the frontier
    (or on the efficient part of the frontier).

18
In Summary (2/2)
  • 4. The extent to which you can decrease the
    volatility of the portfolio depends also on the
    correlation. The lower the average correlation of
    the stocks in your portfolio, the lower you can
    decrease the volatility of your portfolio.
  • 5. The homework provides you with an exercise to
    determine the optimal allocations.
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