Extreme Events – Specimen Question
A.5.2(a) – Answer/Hints
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Q. You know that she has also
used mean-variance optimisation techniques and adopted the same expected
covariances as you would have done in A.5.1. What return assumptions might she
have adopted when choosing her portfolio mix? Specify mathematically all possible
sets of return assumptions she could have adopted and still reached this
answer.
The return assumptions that your colleague might have used
can be derived using implied alphas. These are the (mean) returns that your
colleague needs to have assumed will apply for the portfolio in question to be
deemed efficient.
No constraints are biting in relation to the specific
portfolio mix in question (apart from the constraint that all weights add to
unity). If returns assumed for each asset category are characterised by the
vector 
and if
the portfolio weights are characterised by the vector 
then we
need 
to be at
a maximum, subject to the constraint that 
. Using
Lagrange multipliers as per Section 5.10 of Extreme Events, this
implies that:
It is relatively straightforward to calculate an example that
satisfies this equation using Microsoft Excel. Alternatively, you could use the
Nematrian web function, MnReverseQuadraticPortfolioOptimiser,
which assumes 
but
allows an arbitrary choice of 
(the
input parameter is there called the ‘TradeOffFactor’). Choosing 
gives
the following possible values for 
:
|
|
|
|
1 (i.e. A1)
|
-0.288
|
|
2 (i.e. A2)
|
-0.864
|
|
3 (i.e. A3)
|
2.656
|
|
4 (i.e. A4)
|
5.18
|
|
5 (i.e. A5)
|
6.48
|
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