268 TIME-VARYING RETURN CORRELATIONS AND PORTFOLIOSis the commonly used rolling estimator, where the unconditional means,
variances and co-variances are estimated using a rolling window of fixedN
observations over a sample periodT. The unconditional mean return and
variance of a securityiis estimated as:
Ri=1
N∑Nt= 1Rit (14.6)σ^2 i=1
N− 1∑Nt= 1(
Rit−−
Ri) 2
(14.7)The co-variance between the returns of two securitiesiandkare estimated
as follows:
σi,k=1
N− 1∑Nt= 1(
Rit−Ri)(
Rkt−Rk)
(14.8)One of the main problems with such rolling estimators is that it does
not capture the time-varying nature of means, variances and co-variances.
To capture the time varying nature of variances and co-variances, the sec-
ond method of estimation uses the Dynamic Conditional Correlation (DCC)
model of Engle (2002). The conditional correlation between two random
variabler 1 andr 2 that have mean zero can be written as:
ρ12,t=Et− 1 (r1,tr2,t)
√
Et− 1 (r^2 1,t)Et− 1 (r^2 2,t)(14.9)Lethi,t=Et− 1 (r^2 i,t)and ri,t=
√
hi,tεi,tfor i=1, 2, whereεi,tis a standardized
disturbance that has zero mean and variance of one.
Substituting the above into equation (14.1) we get:
ρ12,t=Et− 1 (ε1,tε2,t)
√
Et− 1 (ε^2 1,t)Et− 1 (ε^2 2,t)=Et− 1 (ε1,tε2,t) (14.10)Using a GARCH (1,1) specification, the covariance between the random
variables can be written as:
q12,t=ρ 12 +α(
ε1,t− 1 ε2,t− 1 −ρ 12)
+β(
q12,t− 1 −ρ 12)
(14.11)The unconditional expectation of the cross product isρ 12 , while for the
variancesρ 12 = 1