Question: Consider the following single index specification: R i = a i + i R M + e i. Where R i is the return on
Consider the following single index specification: Ri = ai + i RM + ei.
Where Ri is the return on security i (X or Y), RM is the return on index M (a broad market index) and ei is a zero-mean white noise random variable not correlated with anything.
Assume that the single index specification correctly describes returns of all securities and the risk-free rate is constant at 4%. Furthermore, you have the following descriptive statistics for returns of Stock X, Y, and index M.
|
| Expected return | Return Standard Deviation | i |
| Stock X | 13% | 30% | 1.5 |
| Stock Y | 9% | 15% | 0.5 |
| Index M | 10% | 20% | 1 |
a)Calculate Jensens alpha of Stock Y.
b)Calculate the information ratio of Stock Y.
c) In light of your answer in part a), design a zero net investment alpha capturing portfolio consisting of Stock X, Stock Y, and Index M. That is, design a portfolio that yields a positive expected return by capturing the alpha in part a) with i) no exposure to the index (zero beta) and ii) zero net investment. Use Stock Y as the numeraire i.e., express the investments (long or short) on Stock X and Index M based on a $1 investment (long or short) in Stock Y.
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