调和高斯似然与Whittle似然及其在频域估计中的应用

Reconciling the Gaussian and Whittle likelihood with an application to estimation in the frequency domain

Annals of Statistics · 2021
被引 25
ABS 4★

中文导读

本文推导了二阶平稳时间序列的高斯似然与Whittle似然之间的精确可解释界限,基于此提出两种新的频域拟似然准则,在模拟中表现出良好的有限样本性质。

Abstract

In time series analysis there is an apparent dichotomy between time and frequency domain methods. The aim of this paper is to draw connections between frequency and time domain methods. Our focus will be on reconciling the Gaussian likelihood and the Whittle likelihood. We derive an exact, interpretable, bound between the Gaussian and Whittle likelihood of a second order stationary time series. The derivation is based on obtaining the transformation which is biorthogonal to the discrete Fourier transform of the time series. Such a transformation yields a new decomposition for the inverse of a Toeplitz matrix and enables the representation of the Gaussian likelihood within the frequency domain. We show that the difference between the Gaussian and Whittle likelihood is due to the omission of the best linear predictions outside the domain of observation in the periodogram associated with the Whittle likelihood. Based on this result, we obtain an approximation for the difference between the Gaussian and Whittle likelihoods in terms of the best fitting, finite order autoregressive parameters. These approximations are used to define two new frequency domain quasi-likelihood criteria. We show that these new criteria can yield a better approximation of the spectral divergence criterion, as compared to both the Gaussian and Whittle likelihoods. In simulations, we show that the proposed estimators have satisfactory finite sample properties.

时间序列分析频域方法时域方法谱估计似然函数