In a time series regression model the residual autoregression function is an unknown, possibly non-linear, function. It is estimated by non-parametric kernel regression. The resulting least-squares estimate of the regression function is shown to be adapative, in the sense of having the same asymptotic distribution, to first order, as estimates based on knowledge of the autoregression function. Also, a Monte Carlo experiment about the behaviour of the estimator is described
AbstractThe residual processes of a stationary AR(p) process and of polynomial regression are consid...
This paper addresses the problem of deriving the asymptotic distribution of the empirical distributi...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...
In a time series regression model the residual autoregression function is an unknown, possibly non-l...
We consider the nonparametric estimation of the distribution of innovations εt in a stationary autor...
Stable autoregressive models of known finite order are considered with martingale differ-ences error...
In a multiple time series regression model the residuals are heteroskedastic and serially correlated...
International audienceThis paper deals with the estimation of a autoregression function at a given p...
AbstractBy relying on the theory of U-statistics of dependent data, we have given a detailed analysi...
We constuct a sequential adaptive procedure for estimating the autoregressive function at a given po...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
E ¢ cient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
A comprehensive description is given of the limiting behaviour of normalised pseudo-MLEs of the coef...
Stable autoregressive models of known finite order are considered with martingale differences errors s...
AbstractA comprehensive description is given of the limiting behaviour of normalised pseudo-MLEs of ...
AbstractThe residual processes of a stationary AR(p) process and of polynomial regression are consid...
This paper addresses the problem of deriving the asymptotic distribution of the empirical distributi...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...
In a time series regression model the residual autoregression function is an unknown, possibly non-l...
We consider the nonparametric estimation of the distribution of innovations εt in a stationary autor...
Stable autoregressive models of known finite order are considered with martingale differ-ences error...
In a multiple time series regression model the residuals are heteroskedastic and serially correlated...
International audienceThis paper deals with the estimation of a autoregression function at a given p...
AbstractBy relying on the theory of U-statistics of dependent data, we have given a detailed analysi...
We constuct a sequential adaptive procedure for estimating the autoregressive function at a given po...
Efficient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
E ¢ cient semiparametric and parametric estimates are developed for a spatial autoregressive model, ...
A comprehensive description is given of the limiting behaviour of normalised pseudo-MLEs of the coef...
Stable autoregressive models of known finite order are considered with martingale differences errors s...
AbstractA comprehensive description is given of the limiting behaviour of normalised pseudo-MLEs of ...
AbstractThe residual processes of a stationary AR(p) process and of polynomial regression are consid...
This paper addresses the problem of deriving the asymptotic distribution of the empirical distributi...
We propose an asymptotically distribution-free transform of the sample autocorrelations of residuals...