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Jamal Munshi, Sonoma State Univesity, 1992 | ||
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Note: Please read i, j, and p a
s subscripts (the i-th and j-th assets and p for portfolio).
Also please read the the number 2 as a superscript eg s2 = s-squared. Also, LT=less than and GT=greater than The equations for portfolio returns and risk
A plot of these relationships produces a curve in k-s space that is quadratic and not linear as shown in this graph The curved line in the middle is a locus of all portfolios where -1 LT rij LT 1. If we now combine these portfolios with risk-free assets (i.e. s=0) we will obtain a straight line in k-s space. This is because the above equations reduce to:
where m is a portfolio of risky assets and p is a portfolio formed with a% in m and the rest (=1-a) in risk free assets f. The m portfolio at the point of tangency shown in the graph below dominates all other m portfolios. We call this the `market portfolio'. If we now enforce the definition of tangency, we obtain an algebraic result that is truly amazing and for which Bill Sharpe was awarded the Nobel Prize in Economics. At the point of tangency the slope of the curve is the same as the slope of the tangential line. The slope of the tangent is
The slope of the curve is dk/ds which can be written as
evaluated at m with a->0 (Why?), the result is
where sim is the covariance between the market portfolio returns and the i-th asset returns We therefore set
Multiply thru by sm and define a parameter bi = sim/smm
Collect terms and get This is the so-called CAPM model of asset pricing and shows how investors evaluate riskiness of assets not being held in isolation but being added to the market portfolio or to a WDP. The following observations are noteworthy
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