Prediction of long memory processes on same-realisation

Abstract: For the class of stationary Gaussian long memory processes, we study some properties of the leastsquares predictor of X n+1 based on (X n , . . . , X 1 ). The predictor is obtained by projecting X n+1 onto the finite past and the coefficients of the predictor are estimated on the same realisation. First we prove moment bounds for the inverse of the empirical covariance matrix. Then we deduce an asymptotic expression of the mean-squared error. In particular we give a relation between the number of terms used to… Show more

“…Remark 3.2. It would be interesting to compare Theorem 3.1 the moment bounds for Γ−1 Kn,n given by Godet [8]. If {u t } is a Gaussian process satisfying (1.2)-(1.5) and (1.8), then Theorem 2.1 of Godet [8] yields that for…”

Estimation of inverse autocovariance matrices for long memory processes

“…Remark 3.2. It would be interesting to compare Theorem 3.1 the moment bounds for Γ−1 Kn,n given by Godet [8]. If {u t } is a Gaussian process satisfying (1.2)-(1.5) and (1.8), then Theorem 2.1 of Godet [8] yields that for…”

Estimation of inverse autocovariance matrices for long memory processes

Order selection for possibly infinite-order non-stationary time series

On the Predictability of Long‐Range Dependent Series