We consider the estimation of the location of the pole and memory parameter, ?0 and a respectively, of covariance stationary linear processes whose spectral density function f(?) satisfies f(?) ~ C|? - ?0|-a in a neighbourhood of ?0. We define a consistent estimator of ?0 and derive its limit distribution Z?0 . As in related optimization problems, when the true parameter value can lie on the boundary of the parameter space, we show that Z?0 is distributed as a normal random variable when ?0 ? (0, p), whereas for ?0 = 0 or p, Z?0 is a mixture of discrete and continuous random variables with weights equal to 1/2. More specifically, when ?0 = 0, Z?0 is distributed as a normal random variable truncated at zero. Moreover, we describe and examine...
AbstractWe consider some parametric spectral estimators that can be used in a wide range of situatio...
Let X = {Xt, t = 1, 2, . . . } be a stationary Gaussian random process, with mean EXt = and covar...
We consider time series that, possibly after integer differencing or integrating or other detrending...
We consider the estimation of the location of the pole and memory parameter, λ0 and α respectively, ...
We consider a parametric spectral density with power-law behaviour about a fractional pole at the un...
Weakly and strongly consistent nonparametric estimates, along with rates of convergence, are establi...
AbstractWeakly and strongly consistent nonparametric estimates, along with rates of convergence, are...
We consider the estimation of the location of the pole and memory parameter ω0 and d of a covariance...
AbstractLet X = {X(t), − ∞ < t < ∞} be a continuous-time stationary process with spectral density fu...
Locally stationary processes are characterised by spectral densities that are functions of rescaled...
Some convergence results on the kernel density estimator are proven for a class of linear processes ...
AbstractThis paper deals with issues pertaining to estimating the spectral density of a stationary h...
summary:Gaussian semiparametric or local Whittle estimation of the memory parameter in standard long...
AbstractLet X = {X(t), −∞<t<∞} be a continuous-time stationary process with spectral density φX(λ; θ...
AbstractThe asymptotic normality of some spectral estimates, including a functional central limit th...
AbstractWe consider some parametric spectral estimators that can be used in a wide range of situatio...
Let X = {Xt, t = 1, 2, . . . } be a stationary Gaussian random process, with mean EXt = and covar...
We consider time series that, possibly after integer differencing or integrating or other detrending...
We consider the estimation of the location of the pole and memory parameter, λ0 and α respectively, ...
We consider a parametric spectral density with power-law behaviour about a fractional pole at the un...
Weakly and strongly consistent nonparametric estimates, along with rates of convergence, are establi...
AbstractWeakly and strongly consistent nonparametric estimates, along with rates of convergence, are...
We consider the estimation of the location of the pole and memory parameter ω0 and d of a covariance...
AbstractLet X = {X(t), − ∞ < t < ∞} be a continuous-time stationary process with spectral density fu...
Locally stationary processes are characterised by spectral densities that are functions of rescaled...
Some convergence results on the kernel density estimator are proven for a class of linear processes ...
AbstractThis paper deals with issues pertaining to estimating the spectral density of a stationary h...
summary:Gaussian semiparametric or local Whittle estimation of the memory parameter in standard long...
AbstractLet X = {X(t), −∞<t<∞} be a continuous-time stationary process with spectral density φX(λ; θ...
AbstractThe asymptotic normality of some spectral estimates, including a functional central limit th...
AbstractWe consider some parametric spectral estimators that can be used in a wide range of situatio...
Let X = {Xt, t = 1, 2, . . . } be a stationary Gaussian random process, with mean EXt = and covar...
We consider time series that, possibly after integer differencing or integrating or other detrending...