We consider the estimation of parametric fractional time series models in which not only is the memory parameter unknown, but one may not know whether it lies in the stationary/invertible region or the nonstationary or noninvertible regions. In these circumstances, a proof of consistency (which is a prerequisite for proving asymptotic normality) can be difficult owing to nonuniform convergence of the objective function over a large admissible parameter space. In particular, this is the case for the conditional sum of squares estimate, which can be expected to be asymptotically efficient under Gaussianity. Without the latter assumption, we establish consistency and asymptotic normality for this estimate in case of a quite general univariate ...
Consistency, asymptotic normality and e ciency of the maximum likelihood estimator for stationary Ga...
Consistency, asymptotic normality, and efficiency of the maximum likelihood estimator for stationary...
We consider a fractional exponential, or FEXP estimator of the memory parameter of a stationary Gaus...
We consider the estimation of parametric fractional time series models in which not only is the memo...
This paper proves consistency and asymptotic normality for the conditional-sum-of-squares estima- to...
We consider truncated (or conditional) sum of squares estimation of a parametric model composed of a...
We analyse consistent estimation of the memory parameters of a nonstationary fractionally cointegrat...
We consider truncated (or conditional) sum-of-squares estimation of a parametric fractional time ser...
Fractional time series models have most commonly been estimated by some version of Whittle estimatio...
We consider statistical inference for multivariate fractionally integrated time series models using ...
This paper considers nonstationary fractional autoregressive integrated moving-average ( p, d, q) mo...
In this paper we quantify the impact of model mis-specification on the properties of parameter estim...
This paper discusses model-based inference in an autoregressive model for fractional processes which...
A semiparametric model is proposed in which a parametric \u85ltering of a non-stationary time series...
D.Phil. (Mathematical Statistics)Fractional Brownian motion and its increment process, fractional Ga...
Consistency, asymptotic normality and e ciency of the maximum likelihood estimator for stationary Ga...
Consistency, asymptotic normality, and efficiency of the maximum likelihood estimator for stationary...
We consider a fractional exponential, or FEXP estimator of the memory parameter of a stationary Gaus...
We consider the estimation of parametric fractional time series models in which not only is the memo...
This paper proves consistency and asymptotic normality for the conditional-sum-of-squares estima- to...
We consider truncated (or conditional) sum of squares estimation of a parametric model composed of a...
We analyse consistent estimation of the memory parameters of a nonstationary fractionally cointegrat...
We consider truncated (or conditional) sum-of-squares estimation of a parametric fractional time ser...
Fractional time series models have most commonly been estimated by some version of Whittle estimatio...
We consider statistical inference for multivariate fractionally integrated time series models using ...
This paper considers nonstationary fractional autoregressive integrated moving-average ( p, d, q) mo...
In this paper we quantify the impact of model mis-specification on the properties of parameter estim...
This paper discusses model-based inference in an autoregressive model for fractional processes which...
A semiparametric model is proposed in which a parametric \u85ltering of a non-stationary time series...
D.Phil. (Mathematical Statistics)Fractional Brownian motion and its increment process, fractional Ga...
Consistency, asymptotic normality and e ciency of the maximum likelihood estimator for stationary Ga...
Consistency, asymptotic normality, and efficiency of the maximum likelihood estimator for stationary...
We consider a fractional exponential, or FEXP estimator of the memory parameter of a stationary Gaus...