APPENDIX
Kalman Filter Design: Lag 1
The state equation of the Kalman filter is given as
The observation equation is given as
Yt=Xt+htThe variance of Ytis calculated as described in the discussion on the obser-
vation equation. We now define
wheregt= 1 – Kt,Ktis the Kalman gain as described in the standard predictor-
corrector framework. The posteriori estimate of the state, and its variance is
given as
We note that the a posterori estimate is actually a convex combination of the
a priori estimate and the observation. The value of gtas computed here en-
sures that the variance of the resulting combination is a minimum. We now
proceed to obtain a recursive relation for. The Kalman equa-
tion for the subscript t– 1 is
Substituting for , we have
ˆˆˆXgXXtt−− 11 |||=−t− 1 () (^21) t t−−2 2 tt−− 33 +−()gYt− − 1 t 1
Xˆtt−− 12 |
ˆˆ
XgXtt−− 11 ||=+−t tt− −−1 12() 1 gYt− − 1 t 1cov(XXˆˆtt−− 12 )ˆˆ
var ˆvar ˆ varvar ˆ var|||||XgX gYX
XY
XY
tt t tt t ttttt ttt t=+−()
()=
()()
()+ ()
−−−1111
gY
YX
tt
ttt=
()
()+ ()−
var
var var ˆ|1ˆˆˆ
var ˆ var ˆ var ˆ cov ˆ ,ˆ|||
|||||XXX
XXX XX
tt t t t t
tt tt t t tt t t−−−−−
−−−−−−−−−=−
()= ()+ ()− ()
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200 RISK ARBITRAGE PAIRS