Hostname: page-component-77c89778f8-n9wrp Total loading time: 0 Render date: 2024-07-17T01:24:32.786Z Has data issue: false hasContentIssue false
  • English
  • Français

CYCLICAL TRENDS IN CONTINUOUS TIME MODELS

Published online by Cambridge University Press:  01 August 2009

Joanne S. Ercolani
Joanne S. Ercolani*
Affiliation:
University of Birmingham
*
*Address correspondence to: Joanne S. Ercolani, Department of Economics, University of Birmingham, Edgbaston, Birmingham, B15 2TT U.K.; email: J.S.Ercolani@bham.ac.uk.
Get access Rights & Permissions [Opens in a new window]

Abstract

It is undoubtedly desirable that econometric models capture the dynamic behavior, like trends and cycles, observed in many economic processes. Building models with such capabilities has been an important objective in the continuous time econometrics literature, for instance, the cyclical growth models of Bergstrom (1966); the economy-wide macroeconometric models of, for example, Bergstrom and Wymer (1976); unobserved stochastic trends of Harvey and Stock (1988 and 1993) and Bergstrom (1997); and differential-difference equations of Chambers and McGarry (2002). This paper considers continuous time cyclical trends, which complement the trend-plus-cycle models in the unobserved components literature but could also be incorporated into Bergstrom type systems of differential equations, as were stochastic trends in Bergstrom (1997).

Type
ARTICLES
Information
Econometric Theory , Volume 25 , Issue 4: Bergstrom Memorial Dedication Issue , August 2009 , pp. 1112 - 1119
Copyright
Copyright © Cambridge University Press 2009

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Bergstrom, A.R. (1966) Monetary phenomena and economic growth: A synthesis of neoclassical and Keynesian theories. Economic Studies Quarterly 17, 18.Google Scholar
Bergstrom, A.R. (1997) Gaussian estimation of mixed-order continuous time dynamic models with unobservable stochastic trends from mixed stock and flow data. Econometric Theory 13, 467505.CrossRefGoogle Scholar
Bergstrom, A.R. & Nowman, K.B. (1999) Gaussian estimation of a two-factor continuous time model of the short-term interest rate. Economic Notes 28, 2541.CrossRefGoogle Scholar
Bergstrom, A.R. & Nowman, K.B. (2007) A Continuous Time Econometric Model of the United Kingdom with Stochastic Trends. Cambridge University Press.CrossRefGoogle Scholar
Bergstrom, A.R., Nowman, K.B. & Wymer, C.R. (1992) Gaussian estimation of a second order continuous time macroeconometric model of the UK. Economic Modelling 9, 313351.CrossRefGoogle Scholar
Bergstrom, A.R. & Wymer, C.R. (1976) A model of disequilibrium neoclassical growth and its application to the United Kingdom. In Bergstrom, A.R. (ed.), Statistical Inference in Continuous Time Economic Models, pp. 267327. North-Holland.Google Scholar
Chambers, M.J. & McGarry, J.S. (2002) Modeling cyclical behavior with differential-difference equations in an unobserved components framework. Econometric Theory 18, 387419.CrossRefGoogle Scholar
Ercolani, J.S. & Chambers, M.J. (2006) Estimation of differential-difference equation systems with unknown lag parameters. Econometric Theory 22, 483498.CrossRefGoogle Scholar
Gandolfo, G. (1981) Qualitative Analysis and Econometric Estimation of Continuous Time Dynamic Models. North-Holland.Google Scholar
Harvey, A.C. (1985) Trends and cycles in macroeconomic time series. Journal of Business and Economic Statistics 3, 216227.Google Scholar
Harvey, A.C. & Jaeger, A. (1993) Detrending, stylized facts and the business cycle. Journal of Applied Econometrics 8, 231247.CrossRefGoogle Scholar
Harvey, A.C. & Stock, J.H. (1988) Continuous time autoregressive models with common stochastic trends. Journal of Economic Dynamics and Control 12, 365384.CrossRefGoogle Scholar
Harvey, A.C. & Stock, J.H. (1993) Estimation, smoothing, interpolation and distribution for structural time series models in continuous time. In Phillips, P.C.B. (ed.), Models, Methods and Applications of Econometrics: Essays in Honour of A.R. Bergstrom. Blackwell.Google Scholar
Harvey, A.C. & Trimbur, T.M. (2003) General model-based filters for extracting cycles and trends in economic time series. The Review of Economics and Statistics 85(2), 244255.CrossRefGoogle Scholar
Trimbur, T.M. (2006) Properties of higher order stochastic cycles. Journal of Time Series Analysis 27(1), 117.CrossRefGoogle Scholar