This paper studies functional local unit root models (FLURs) in which the autoregressive coefficient may vary with time in the vicinity of unity. We extend conventional local to unity (LUR) models by allowing the localizing coefficient to be a function which characterizes departures from unity that may occur within the sample in both stationary and explosive directions. Such models enhance the flexibility of the LUR framework by including break point, trending, and multi-directional departures from unit autoregressive coefficients. We study the behavior of this model as the localizing function diverges, thereby determining the impact on the time series and on inference from the time series as the limits of the domain of definition of the autore...
Two approaches have dominated formulations designed to capture small departures from unit root autor...
While differencing transformations can eliminate nonstationarity, they typically reduce signal streng...
It is well known that unit root limit distributions are sensitive to initial conditions in the dista...
This paper studies functional local unit root models (FLURs) in which the autoregressive coefficient ...
Limit theory for regressions involving local to unit roots (LURs) is now used extensively in time se...
Limit theory for regressions involving local to unit roots (LURs) is now used extensively in time se...
A limit theory is established for autoregressive time series that smooths the transition between loc...
We analyze the applicability of standard normal asymptotic theory for linear process models near the...
New methods are developed for identifying, estimating and performing inference with nonstationary ti...
A prominent use of local to unity limit theory in applied work is the construction of confidence inte...
This paper develops an asymptotic theory for a first order autoregression with a root near unity. Dev...
An asymptotic theory is given for autoregressive time series with weakly dependent innovations and a...
An asymptotic theory is given for autoregressive time series with a root of the form ρ n = 1 + c/ n ...
A limit theory is established for autoregressive time series that smooths the transition between loc...
First order autoregression is shown to satisfy a limit theory which is uniform over stationary value...
Two approaches have dominated formulations designed to capture small departures from unit root autor...
While differencing transformations can eliminate nonstationarity, they typically reduce signal streng...
It is well known that unit root limit distributions are sensitive to initial conditions in the dista...
This paper studies functional local unit root models (FLURs) in which the autoregressive coefficient ...
Limit theory for regressions involving local to unit roots (LURs) is now used extensively in time se...
Limit theory for regressions involving local to unit roots (LURs) is now used extensively in time se...
A limit theory is established for autoregressive time series that smooths the transition between loc...
We analyze the applicability of standard normal asymptotic theory for linear process models near the...
New methods are developed for identifying, estimating and performing inference with nonstationary ti...
A prominent use of local to unity limit theory in applied work is the construction of confidence inte...
This paper develops an asymptotic theory for a first order autoregression with a root near unity. Dev...
An asymptotic theory is given for autoregressive time series with weakly dependent innovations and a...
An asymptotic theory is given for autoregressive time series with a root of the form ρ n = 1 + c/ n ...
A limit theory is established for autoregressive time series that smooths the transition between loc...
First order autoregression is shown to satisfy a limit theory which is uniform over stationary value...
Two approaches have dominated formulations designed to capture small departures from unit root autor...
While differencing transformations can eliminate nonstationarity, they typically reduce signal streng...
It is well known that unit root limit distributions are sensitive to initial conditions in the dista...