Maximizing Alpha Performance Through Optimal Strategies

The Model Nonlinear Alpha Alpha and Volatility Small Sample Alpha

Performance Maximization
of Actively Managed Funds

Paolo Guasoni1 Gur Huberman2 Zhenyu Wang3

1 Boston University
2 Columbia Business School
3 Federal Reserve Bank of New York

European Summer Symposium in Financial Markets
July 21, 2008


Portfolio Manager vs. Evaluator

Evaluator observes excess returns.
Over a ﬁxed-interval grid
For a long time
Evaluator does NOT know positions.
Evaluator compares returns against benchmarks.
Manager aware of evaluation process.
Tries to manipulate performance.


Performance Evaluation

Evaluator observes the fund and benchmarks’ returns.
Performs a linear regression.
Intercept alpha: excess preformance.
Sharpe ratio: average excess return / standard deviation
Appraisal ratio: alpha / tracking error
Sharpe ratio of hedged portfolio.


Alpha without Ability

Return on index
8%
Return on index calls
Return on the fund
Regression line
Excess Fund Return

0%

Nonzero alpha!

-8%
-8% 0% 8%
Excess Market Return


Superior Performance

Private information which predicts benchmarks payoﬀs.
Access to additional assets.
Access to derivatives on benchmarks.
Trades more frequent than observations.


This Paper

An explicit strategy which maximizes the Sharpe ratio,
delivers the highest asymptotic t-stat of alpha.
If benchmark prices follow Brownian motion, can derivatives
or delta trading deliver a signiﬁcant t-stat?
If options are priced by Black-Scholes, it will take many years.
Why does BXM out-perform?


Model

Xb : payoffs spanned by benchmarks.
(under CAPM, payoff of the form x = aR f + bR m ).
Risk-free rate exists. 1 ∈ Xb .
Xa : payoffs available to the manager.
Xb ⊂ Xa .
mb ∈ Xb and ma ∈ Xa minimum norm SDFs.
Attain Hansen-Jagannathan bounds.
No borrowing/short-selling constraints.
Xb and Xa closed linear spaces.


Large Sample Alpha

Manager chooses the same payoﬀ x from Xa at all periods.
Per-period returns are IID. Within period, not necessarily.
Evaluator observes IID realizations x1 , . . . xn of x.


Maximization of Alpha

The alpha of a strategy x ∈ Xa converges to:
1

α(x) = R f E [x(mb − ma )] (1)

The maximal t-statistic of alpha satisﬁes:
2

max
tn
s max = lim √ =R f E [(mb − ma )2 ] (2)
n
n→∞

=R f Var(ma ) − Var(mb ) (3)

Achieved by the payoﬀs:
3

x = ξ + l(mb − ma ) (4)

for arbitrary ξ ∈ Xb and l > 0.


Sharpe Ratios and t statistic

The increase in squared Sharpe ratios is:

(R f )2 (Var(ma ) − Var(mb )) (5)

R 2 of any payoﬀ maximizing the Sharpe-ratio:

Var(mb )
R2 = (6)
Var(ma )

To generate highly signiﬁcant alpha, the manager trades the
zero-beta portfolio mb − ma .
t statistic of alpha grows with gap in discount factor variance.
Increase in Sharpe ratio grows with t statistic.


Geometric Brownian Model

A risk-free rate r and several benchmarks Sti .
d
dSti
σij dWtj 1≤i ≤d
=µi dt + (7)
Sti j=1

(Wti )1≤i≤d is a d-dimensional Brownian Motion,
t
µ = (µi )1≤i≤d is the vector of expected returns, and the
volatility matrix σ = (σij )1≤i,j≤d is nonsingular.
Market is complete.


Discount Factors

Returns joint lognormal:

R f =e rt
√
Σii
R i =e (µi − )t+ tψi
1≤i ≤d
2

where Σ = σ σ, and ψ ∼ N(0, Σ).
Stochastic discount factors:
√
(µ−r ¯ Σ−1 (µ−r ¯
1) 1)
t+ t(µ−r ¯ Σ−1 ψ
− r+ 1)
2
ma =e
1 1
− f (E [R] − R f ) S −1 (R − E [R])
mb = f
R R
where S is the covariance matrix of simple returns.


t statistic of Black Scholes alpha

For one benchmark, a Taylor expansion shows that:
2
max µ−r
tn t
s max = lim √ ≈ √ + O(t 2 )
(µ − r ) +
σ
n
n→∞ 2

Dominant term of order t.
Alpha arises from the mismatch between trading and
monitoring frequencies.
Disappears in the continuous-time limit.
How big in practice?
Optimal payoﬀ?


Optimal Alpha Payoﬀ
B. The Hedged Strategy
15%

10%

5%

0%

-5%

-10%

-15%
-20% -15% -10% -5% 0% 5% 10% 15% 20%
Rate of Return on the Benchmark


Years to Signiﬁcance

Factors Benchmark Attainable t stat Years
Sharpe Sharpe
Monthly Observations
MKT 0.11 0.11 0.01 2084
MKT,SMB,HML 0.27 0.27 0.06 103
MKT,SMB,HML,MOM 0.37 0.38 0.10 30

Factors estimated from 1:1963-12:2006.


Varying Observation Length

Factors Benchmark Attainable Years
Sharpe Sharpe
Monthly Observations
MKT 0.11 0.11 2084
MKT,SMB,HML,MOM 0.37 0.38 30
Quarterly Observations
MKT 0.19 0.2 694
Semi Annual Observations
MKT 0.27 0.28 346


Liquid Index Options

Factors Benchmark Attainable Years
Sharpe Sharpe
SPX 0.12 0.12 1803
SPX,NDX 0.13 0.13 1148
SPX,NDX,RUT 0.13 0.13 1052


BXM Performance: a contradiction?

Period S&P 500 BXM Alpha t-stat
1990.01-2005.12 7.1% 6.8% 2.7% 2.2
1990.01-1994.12 4.5% 6.6% 4.1% 2.6
1995.01-1999.12 21.4% 14.3% 2.4% 0.9
2000.01-2005.12 -2.7% 0.8% 2.5% 1.2
Nonlinearity does not generate signiﬁcant alpha in the
Black-Scholes model.
But call writing (BXM) or put writing (Lo, 2001) have
signiﬁcant alpha and high Sharpe ratio.
These strategies use actual option prices.


Implied Volatility?

Implied volatility is consistently higher than realized volatility.
Over the period 1990-2004, historical volatility of the S&P
500 averaged 16%, versus 20% of at-the-money volatility
measured by the VIX index.
Does this feature explain observed alpha?


Alpha with Implied Volatility

Single benchmark:
√
σ2
St = S0 e (µ− )t+σ tψ
(8)
2

Options still priced by the Black-Scholes formula, but with
another value for volatility σ = λσ.
ˆ
Nonspeciﬁcation of a continuous-time dynamics.
Setting consistent with discrete-time model.
Market not complete.
Option trading not equivalent to dynamic trading.


Alpha with Implied Volatility

Period Historical Implied Ratio Max
Vol Vol Appraisal
1990.01-2005.12 16% 19% 1.21 5.77
1990.01-1994.12 12% 17% 1.39 14.01
1995.01-1999.12 16% 20% 1.27 7.96
2000.01-2005.12 19% 21% 1.11 1.48


The Discount Factor

Black-Scholes formula holds with implied volatility σ = λσ, so
ˆ
ψ is normal also under the risk-neutral measure Q.
The conditions:

EQ [St ] =e rt (9)
22
VarQ (log St ) =λ σ t (10)
√ σ2
imply that ψ ∼ N(δ t, λ2 ), where δ = − µ−r + − λ2 ).
2 (1
σ
The discount factor ma is:
√
(ψ−δ t)2
ψ2
e −rt+ 2 −
dQ 2λ2
ma = e −rt = (11)
dP λ
mb is the same as before, since it ignores option prices.


The t statistic

The variance of ma is:
δ2 t
 
e 2−λ2
Var(ma ) = e −2rt  √ − 1 (12)
λ 2 − λ2
√
provided that λ ≤ 2, otherwise it is inﬁnite.
A Taylor expansion shows that:

max
tn 1
lim √ = √
Var(ma ) − Var(mb ) ≈ − 1+O(t)
n λ 2 − λ2
n→∞
(13)
Dominant term now of order zero.
Alpha does not disappear for small t.


Path-dependent Strategies

Two restrictive assumptions.
Large Samples.
Sample moments replaced by population values.
Constant strategies.
Manager chooses same payoﬀ at each period.
Can a path-dependent strategy do better in the large sample?
And in a small sample?


The Limits of Path-dependent Alpha

Path-dependent strategies...
...are useless in large samples;
...have small alphas in small samples.


Model Setting

One benchmark.
IID Returns (xi )i≥1 with mean µ and variance σ 2 .
One uncorrelated payoff.
IID Returns (zi )i≥1 IID with mean a and variance s 2 .
Managed portfolio holds a fixed unit of the payoff z, but a
time-varying benchmark exposure.
Portfolio return is yi = βi xi + zi .
βi arbitrary, but only depends on the past
β1 , x1 , z1 , . . . , βi−1 , xi−1 , zi−1 .


Sample Quantities

After n periods, the evaluator estimates alpha and its
signiﬁcance with the usual estimators:
n n n
1 1 1
i=1 xi yi − ( n i=1 xi )( n i=1 yi )
ˆ
βn = n n n
1 2 − (1 2
i=1 xi i=1 xi )
n n
n n
1 ˆ1
yi − βn
αn =
ˆ xi
n n
i=1 i=1

ˆ
Make βn negatively correlated with benchmark return.
This makes αn positively biased.
ˆ


Path Dependence Useless in Large Sample
Theorem
If E [xi4 ] < ∞, and the portfolio (βi )i≥1 satisﬁes:
n n
1 1
βi2 = b 2 + v
lim βi = b lim
n→∞ n n→∞ n
i=1 i=1

then the following hold:
ˆn
t a
ˆ lim √ =
lim αn = a
ˆ lim βn = b
n
n→∞ n→∞ n→∞ 2 +σ 2 )2
s 2 + v (µ σ2

Alpha only comes from the uncorrelated payoﬀ z.
Fluctuations in beta only add tracking error, as captured by v .
Better use βi = b, a constant strategy with v = 0.


Bounding Small Sample Alpha

Take a continuous time approximation.
The benchmark return dXt = dSt /St follows the diﬀusion:

dXt = µdt + σdBt

where Bt is a Brownian Motion.
The portfolio return dYt is:

dYt = βt dXt

Set leverage bounds: βt ∈ [β min , β max ].
Maximize expected alpha.


Theorem
Maximum alpha is:

σ 1 2
E [ˆ T ] ≤ √ (β max − β min )
α
3 π
T
Optimal bang-bang strategy:

β min if Bt ≥ 0
opt
βt =
β max if Bt < 0

Keep low beta when return to date positive, and high beta
when negative.
σ = 15%, β min = 0.5 and β max = 1.5 deliver maximum
expected alphas of 1.78% for T = 5 years and 1.26% for
T = 10.


Conclusion

Alpha as the gap between evaluator and market pricing.
A zero-beta portfolio maximizes significance of alpha.
Nonlinearity alone does not explain observed alpha.
Nor do small sample effects.
Misspecifications are central.


Thank You!

Maximizing Alpha Performance Through Optimal Strategies

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