1 edition of Higher order residual analysis for nonlinear time series with autoregressive correlation structures found in the catalog.
Higher order residual analysis for nonlinear time series with autoregressive correlation structures
Peter A. W. Lewis
The paper considers nonlinear time series whose second order autocorrelations satisfy autoregressive Yule-Walker equations. The usual linear residuals are then uncorrelated, but not independent, as would be the case for linear autoregressive processes. Two such types of nonlinear model are treated in some detail; random coefficient autoregression and multiplicative autoregression. The proposed analysis involves crosscorrelation of the usual linear residuals and their squares. This function is obtained for the two types of model considered, and allows differentiation between models with the same autocorrelation structure in the same class. For the random coefficient models it is shown that one side of the crosscorrelation function is zero, giving a useful signature of these processes. The non-zero features of the crosscorrelations are informative of the higher order dependency structure. In applications this residual analysis requires only standard statistical calculations, and extends rather than replaces the usual second order analysis.
|Statement||by P.A.W. Lewis and A.J. Lawrance|
|Contributions||Lawrance, A. J., Naval Postgraduate School (U.S.)|
|The Physical Object|
|Pagination||24 p. :|
|Number of Pages||24|
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