|
Step 4: Revised (Posterior) Expectations
The baseline forecasts of expected returns derived from market values and their covari-
ance matrix comprise the prior distribution of the rates of return on bonds and stocks. The
manager’s view, together with its confidence measure, provides the probability distribution
arising from the “experiment,” that is, the additional information that must be optimally
integrated with the prior distribution. The result is the posterior: a new set of expected
returns, conditioned on the manager’s views.
To acquire intuition about the solution, consider what the baseline expected returns
imply about the view. The expectations derived from market data were that the expected
return on bonds is 1.40% and on stocks 6.81%. Therefore, the baseline view is that E ( R
B
) 2
E ( R
S
) 5 2 5.41%. In contrast, the manager thinks this difference is Q 5 R
B
2 R
S
5 .5%.
Using the BL linear-equation notation for market expectations:
Q
E
5 PR
E
T
P
5 (1, 21)
R
E
5 3E(R
B
), E(R
S
)
4 5 (1.40%, 6.81%)
Q
E
5 1.40 2 6.81 5 25.41%
(27.12)
8
A simpler view that bonds will return 3% is also legitimate. In that case P 5 (1, 0) and the view is really like an
alpha forecast in the Treynor-Black model. If all views were like this simple one, there would be no difference
between the TB and BL models.
9
Absent specific information shedding light on the SD of the view, for example, the track record of the source of
the view, the SD calculated from the covariance matrix of the baseline forecasts is commonly used. In that case,
the SD would be that of Q
E
in Equation 27.13: s(Q
E
)
5 ".0002714 5 .0165 (1.65%).
10
Notice that the view is expressed as a row vector with as many elements as there are risky assets (here, two)
applied to the row vector of returns. The manager’s view ( Q ) is obtained from the vector, P, marking the assets
included in the view, times their actual returns. We denote the return row vector, R, with a superscript “ T ” (for
transpose—turning a row vector into a column), and therefore compute the “sumproduct” of the two vectors.
More generally, any view that is a linear combination of the relevant excess returns
can be presented as an array (in Excel, an array would be a column of numbers) that
multiplies another array (column) of excess returns. In this case, the array of weights is
P 5 (1, 2 1) and the array of excess returns is ( R
B
, R
S
). The value of this linear combina-
tion, denoted Q, reflects the manager’s view. In this case, Q 5 .5% must be taken into
account in optimizing the portfolio.
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P A R T V I I
Applied Portfolio Management
Thus, the baseline “view” is 2 5.41% (i.e., stocks will outperform bonds), which is vastly
different from the manager’s view. The difference, D, and its variance are
D
5 Q 2 Q
E
5 .005 2 (2.0541) 5 .0591
s
2
(D)
5 s
2
(
e) 1 s
2
(Q
E
)
5 .0003 1 s
2
(Q
E
)
s
2
(Q
E
)
5 Var3E(R
B
)
2 E(R
S
)
4 5 s
E( R
B
)
2
1 s
E( R
S
)
2
2 2Cov3 E( R
B
), E(R
S
)
4
5 .000064 1 .000289 2 2 3 .0000408 5 .0002714
s
2
( D)
5 .0003 1 .0002714 5 .0005714
(27.13)
Given the large difference between the manager’s and the baseline views, we would expect
a significant change in the conditional expected returns from those of the baseline and, as
a result, a very different optimal portfolio.
The expected returns conditional on the view is a function of four elements: the baseline
expectations, E ( R ); the difference, D, between the manager’s view and the baseline view
(see Equation 27.13); the contribution of the asset return to the variance of D; and the total
variance of D. The result is:
E(R
0view) 5 R 1 D
Contribution of asset to s
D
2
s
D
2
E(R
B
0
P)
5 E(R
B
)
1
D
5s
E(R
B
)
2
2 Cov3 E( R
B
), E(R
S
)
46
s
D
2
5 .0140 1
.0591(.000064
2 .0000408)
.0005714
5 .0140 1 .0024 5 .0164
E(R
S
0
P)
5 E(R
S
)
1
D
5Cov3E(R
B
), E(R
S
)
4 2 s
E( R
S
)
2
6
s
D
2
(27.14)
5 .0681 1
.0591(.0000408
2 .000289)
.0005714
5 .0681 2 .0257 5 .0424
We see that the manager increases his expected returns on bonds by .24% to 1.64%, and
reduces his expected return on stocks by 2.57% to 4.24%. The difference between the
expected returns on stocks and bonds is reduced from 5.41% to 2.60%. While this is a very
large change, we also realize that the manager’s private view that Q 5 .5% has been greatly
tempered by the prior distribution to a value roughly halfway between his private view and
the baseline view. In general, the degree of compromise between views will depend on the
precision assigned to them.
The example we have described contains only two assets and one view. It can easily be
generalized to any number of assets with any number of views about future returns. The
views can be more complex than a simple difference between a pair of returns. Views can
assign a value to any linear combination of the assets in the universe, and the confidence
level (the covariance matrix of the set of á values of the views) can allow for dependence
across views. This flexibility gives the model great potential by quantifying a rich set of
information that is unique to a portfolio manager. Appendix B to the chapter presents the
general BL model.
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