%0 Generic %A van Delft, Anne %A Eichler, Michael %D 2018 %T Data-adaptive estimation of time-varying spectral densities %U https://tandf.figshare.com/articles/dataset/Data-adaptive_estimation_of_time-varying_spectral_densities/6987044 %R 10.6084/m9.figshare.6987044.v1 %2 https://ndownloader.figshare.com/files/12813686 %2 https://ndownloader.figshare.com/files/12813689 %2 https://ndownloader.figshare.com/files/12813692 %2 https://ndownloader.figshare.com/files/12813695 %2 https://ndownloader.figshare.com/files/12813698 %2 https://ndownloader.figshare.com/files/12813701 %2 https://ndownloader.figshare.com/files/12813707 %2 https://ndownloader.figshare.com/files/12813713 %2 https://ndownloader.figshare.com/files/12813725 %2 https://ndownloader.figshare.com/files/12813731 %2 https://ndownloader.figshare.com/files/12813743 %K Local stationary processes %K data-adaptive kernel estimation %X

This paper introduces a data-adaptive non-parametric approach for the estimation of time-varying spectral densities from nonstationary time series. Time-varying spectral densities are commonly estimated by local kernel smoothing. The performance of these nonparametric estimators, however, depends crucially on the smoothing bandwidths that need to be specified in both time and frequency direction. As an alternative and extension to traditional bandwidth selection methods, we propose an iterative algorithm for constructing localized smoothing kernels data-adaptively. The main idea, inspired by the concept of propagation-separation (Polzehl and Spokoiny, 2006), is to determine for a point in the time-frequency plane the largest local vicinity over which smoothing is justified by the data. By shaping the smoothing kernels nonparametrically, our method not only avoids the problem of bandwidth selection in the strict sense but also becomes more flexible. It not only adapts to changing curvature in smoothly varying spectra but also adjusts for structural breaks in the time-varying spectrum.

%I Taylor & Francis