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Open Higher Order Continuous-Time Dynamic Model with Mixed Stock and Flow Data and Derivatives of Exogenous Variables
Published online by Cambridge University Press: 11 February 2009
Abstract
This paper is concerned with deriving formulae for higher order derivatives of exogenous variables for use in estimating the parameters of an open secondorder continuous time model with mixed stock and flow data and first and second order derivatives of exogenous variables which are not observable. This should provide the basis for the future estimation of continuous time models in a range of applied areas using the new Gaussian estimation computer program developed by Nowman [4].
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- Copyright © Cambridge University Press 1991
References
REFERENCES
1.
Bergstrom, A.R.
The estimation of open higher order
continuous time dynamic models with mixed stock
and flow data. Econometric
Theory
2 (1986):
350–373.CrossRefGoogle Scholar
2.
Chambers, M.J.
Discrete models for estimating
general linear continuous time
systems. Econometric
Theory, forthcoming.Google Scholar
3.Hendry, D.F.,
Pagan, A.R.
& Sargan, J.D..
Dynamic specification. In Griliches, Z.
and Intriligator, M.D.
(eds.), Handbook of Econometrics,
Chapter 18 and pp.
1023–1100.
Amsterdam:
North Holland,
1984.10.1016/S1573-4412(84)02010-9CrossRefGoogle Scholar
4.
Nowman, K.B.
Computer program manual for computing the Gaussian
estimates of an open second order continuous time
dynamic model with mixed stock and flow data.
Unpublished paper, University of Essex,
1991.Google Scholar
5.Nowman, K.B.
Finite sample properties of the Gaussian estimation
of an open higher order continuous time dynamic
model with mixed stock and flow data. In Gandolfo, G.
(ed.), Continuous Time Econometrics: Theory
and Applications.
London:
Chapman and Hall,
forthcoming.Google Scholar
6.Phillips, P.C.B.
Error correction and long run
equilibria in continuous time.
Econometrica,
forthcoming.Google Scholar
7.Robinson, P.M.
The estimation of linear differential
equations with constant
coefficients.
Econometrica
44 (1976):
751–764.CrossRefGoogle Scholar
8.Robinson, P.M.
Instrumental variables estimation of
differential equations.
Econometrica
44 (1976):
765–776.CrossRefGoogle Scholar
9.Robinson, P.M.
Continuous-time models in econometrics: Closed and
open systems, stocks and flows. In Phillips, P.C.B
and Hall, V.B.
(eds.), Models, Methods and Applications of
Econometrics.
Oxford:
Basil Blackwell,
forthcoming.Google Scholar
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