We discuss the estimation of the order of integration of a fractional process that may be contaminated by a time-varying deterministic trend or by a break in the mean. We show that in some cases the estimate may still be consistent and asymptotically normally distributed even when the order of magnitude of the spectral density of the fractional process does not dominate the one of the periodogram of the contaminating term. If trimming is introduced, stronger deterministic components may be neglected. The performance of the estimate in small samples is studied in a Monte Carlo experiment
and Queen’s University Asymptotic properties of the local Whittle estimator in the nonstationary cas...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
The discrete Fourier transform (dft) of a fractional process is studied. An exact representation of ...
We consider the local Whittle estimation of the memory parameter of a strongly dependent time series...
In this article, we describe and implement the local Whittle and exact local Whittle estimators of t...
Recently, Shimotsu and Phillips (2005, Annals of Statistics 33, 1890–1933) developed a new semiparam...
We propose a semiparametric local polynomial Whittle with noise estimator of the memory pa- rameter ...
Semiparametric estimation of a bivariate fractionally cointegrated system is con-sidered. We propose...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
The paper presents a comparative study on the performance of commonly used estimators of the fractio...
We analyse asymptotic properties of the discrete Fourier transform and the periodogram of time serie...
We consider testing for the presence of a change in mean, at an unknown point in the sample, in data...
We analyze asymptotic properties of the discrete Fourier transform and the periodogram of time serie...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
I consider a bivariate stationary fractional cointegration system and I propose a quasi-maximum like...
and Queen’s University Asymptotic properties of the local Whittle estimator in the nonstationary cas...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
The discrete Fourier transform (dft) of a fractional process is studied. An exact representation of ...
We consider the local Whittle estimation of the memory parameter of a strongly dependent time series...
In this article, we describe and implement the local Whittle and exact local Whittle estimators of t...
Recently, Shimotsu and Phillips (2005, Annals of Statistics 33, 1890–1933) developed a new semiparam...
We propose a semiparametric local polynomial Whittle with noise estimator of the memory pa- rameter ...
Semiparametric estimation of a bivariate fractionally cointegrated system is con-sidered. We propose...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
The paper presents a comparative study on the performance of commonly used estimators of the fractio...
We analyse asymptotic properties of the discrete Fourier transform and the periodogram of time serie...
We consider testing for the presence of a change in mean, at an unknown point in the sample, in data...
We analyze asymptotic properties of the discrete Fourier transform and the periodogram of time serie...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
I consider a bivariate stationary fractional cointegration system and I propose a quasi-maximum like...
and Queen’s University Asymptotic properties of the local Whittle estimator in the nonstationary cas...
An exact form of the local Whittle likelihood is studied with the intent of developing a general pur...
The discrete Fourier transform (dft) of a fractional process is studied. An exact representation of ...