AbstractIt is shown that the finite linear least-squares predictor of a multivariate stationary process converges to its Kolmogorov-Wiener predictor at an exponential rate, provided that the entries of its spectral density matrix are smooth functions. Also, the same rate of convergence holds for the partial sums of the Kolmogorov-Wiener predictor
AbstractLet X1,…,Xn be n consecutive observations of a linear process X1=μ+∑r=0∞ArZt−r, where μ is a...
We derive uniform convergence results of lag-window spectral density estimates for a general class o...
summary:Important characteristics of any algorithm are its complexity and speed in real calculations...
AbstractIt is shown that the finite linear least-squares predictor of a multivariate stationary proc...
AbstractIt is shown that the positivity of the angle between the past and future of a multivariate s...
AbstractThe Hölder classes Λa of vector-valued functions are defined. The functions in each space Λa...
Linear prediction theory for multivariate, one- dimensional, stationary, stochastic processes with f...
For the class of stationary Gaussian long memory processes, we study some properties of the least-sq...
AbstractThis paper presents a convergence theorem for an iterative method of spectral factorization ...
International audienceWe present two approaches for linear prediction of long-memory time series. Th...
This PhD thesis deals with predicting long-memory processes. We assume that the processes are weakly...
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 present two approaches for linear prediction of long-memory time series. The first approach consi...
AbstractIn this paper we introduce a new perspective of linear prediction in the functional data con...
AbstractLet X1,…,Xn be n consecutive observations of a linear process X1=μ+∑r=0∞ArZt−r, where μ is a...
We derive uniform convergence results of lag-window spectral density estimates for a general class o...
summary:Important characteristics of any algorithm are its complexity and speed in real calculations...
AbstractIt is shown that the finite linear least-squares predictor of a multivariate stationary proc...
AbstractIt is shown that the positivity of the angle between the past and future of a multivariate s...
AbstractThe Hölder classes Λa of vector-valued functions are defined. The functions in each space Λa...
Linear prediction theory for multivariate, one- dimensional, stationary, stochastic processes with f...
For the class of stationary Gaussian long memory processes, we study some properties of the least-sq...
AbstractThis paper presents a convergence theorem for an iterative method of spectral factorization ...
International audienceWe present two approaches for linear prediction of long-memory time series. Th...
This PhD thesis deals with predicting long-memory processes. We assume that the processes are weakly...
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 present two approaches for linear prediction of long-memory time series. The first approach consi...
AbstractIn this paper we introduce a new perspective of linear prediction in the functional data con...
AbstractLet X1,…,Xn be n consecutive observations of a linear process X1=μ+∑r=0∞ArZt−r, where μ is a...
We derive uniform convergence results of lag-window spectral density estimates for a general class o...
summary:Important characteristics of any algorithm are its complexity and speed in real calculations...