AbstractIn this paper, the spectral density estimation of a nonstationary class of stochastic processes is investigated. Although these processes are not stationary with respect to the additive binary operation, i.e., in the classical weak sense, they are stationary with respect to the multiplicative binary operation. These processes exist naturally as continuous-time processes. In order to answer many questions in practical situations using these processes, we develop a random sampling method for estimating their spectral densities by using a discrete-time process. Some simulation results are given
Dans ce travail nous nous intéressons à l'estimation de la densité spectrale par la méthode du noyau...
AbstractLet X = {X(t), −∞<t<∞} be a continuous-time stationary process with spectral density φX(λ; θ...
A spectral density matrix estimator for stationary stochastic vector processes is studied. As the du...
AbstractIn this paper, the spectral density estimation of a nonstationary class of stochastic proces...
AbstractLet X = {X(t), − ∞ < t < ∞} be a continuous-time stationary process with spectral density fu...
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...
Locally stationary processes are characterised by spectral densities that are functions of rescaled...
International audienceIn numerous applications data are observed at random times and an estimated gr...
In this paper, we develop the non-parametric spectral analysis for non-stationary discrete-time stoc...
AbstractLet {X(t), −∞ < t < ∞} be a real-valued stationary process with a bivariate probability dens...
AbstractFor weakly stationary stochastic processes taking values in a Hilbert space, spectral repres...
Spectral analysis of stationary processes has played an essential role in the development of Time Se...
This is the first of a series of papers treating randomly sampled random processes. Spectral analysi...
Let χ1(t), χ2(t), …, χN(t) be N sample functions of a stationary random process with mean zero, vari...
Dans ce travail nous nous intéressons à l'estimation de la densité spectrale par la méthode du noyau...
AbstractLet X = {X(t), −∞<t<∞} be a continuous-time stationary process with spectral density φX(λ; θ...
A spectral density matrix estimator for stationary stochastic vector processes is studied. As the du...
AbstractIn this paper, the spectral density estimation of a nonstationary class of stochastic proces...
AbstractLet X = {X(t), − ∞ < t < ∞} be a continuous-time stationary process with spectral density fu...
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...
Locally stationary processes are characterised by spectral densities that are functions of rescaled...
International audienceIn numerous applications data are observed at random times and an estimated gr...
In this paper, we develop the non-parametric spectral analysis for non-stationary discrete-time stoc...
AbstractLet {X(t), −∞ < t < ∞} be a real-valued stationary process with a bivariate probability dens...
AbstractFor weakly stationary stochastic processes taking values in a Hilbert space, spectral repres...
Spectral analysis of stationary processes has played an essential role in the development of Time Se...
This is the first of a series of papers treating randomly sampled random processes. Spectral analysi...
Let χ1(t), χ2(t), …, χN(t) be N sample functions of a stationary random process with mean zero, vari...
Dans ce travail nous nous intéressons à l'estimation de la densité spectrale par la méthode du noyau...
AbstractLet X = {X(t), −∞<t<∞} be a continuous-time stationary process with spectral density φX(λ; θ...
A spectral density matrix estimator for stationary stochastic vector processes is studied. As the du...