$p/n\为0$时样本自协方差矩阵的联合收敛性及其应用

IF 3.2 1区数学 Q1 STATISTICS & PROBABILITY

Annals of Statistics Pub Date : 2019-12-01 DOI:10.1214/18-aos1785

M. Bhattacharjee, A. Bose

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引用次数: 6

摘要

考虑一个高维线性时间序列模型，其中维度p和样本大小n以p/n的方式增长→ 设Γu是uth阶样本自协方差矩阵。我们首先证明了在驱动序列上的独立性和矩假设以及系数矩阵上的弱假设下，{Γu，Γu≥0}中任何对称多项式的LSD都存在。这个LSD结果，加上一些额外的努力，暗示了{Γ，Γ，u≥0}中任何多项式的迹的渐近正态性。我们还研究了几个独立MA过程的类似结果。我们展示了上述结果在统计推理问题中的应用，例如在高维MA过程的未知阶的估计中，以及在一个或多个这样的独立过程的系数矩阵的假设的图形和显著性检验中。

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Joint convergence of sample autocovariance matrices when $p/n\to 0$ with application

Consider a high dimensional linear time series model where the dimension p and the sample size n grow in such a way that p/n → 0. Let Γ̂u be the uth order sample autocovariance matrix. We first show that the LSD of any symmetric polynomial in {Γ̂u, Γ̂u, u ≥ 0} exists under independence and moment assumptions on the driving sequence together with weak assumptions on the coefficient matrices. This LSD result, with some additional effort, implies the asymptotic normality of the trace of any polynomial in {Γ̂u, Γ̂u, u ≥ 0}. We also study similar results for several independent MA processes. We show applications of the above results to statistical inference problems such as in estimation of the unknown order of a highdimensional MA process and in graphical and significance tests for hypotheses on coefficient matrices of one or several such independent processes.

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来源期刊

Annals of Statistics 数学-统计学与概率论

CiteScore

9.30

自引率

8.90%

发文量

119

审稿时长

6-12 weeks

期刊介绍： The Annals of Statistics aim to publish research papers of highest quality reflecting the many facets of contemporary statistics. Primary emphasis is placed on importance and originality, not on formalism. The journal aims to cover all areas of statistics, especially mathematical statistics and applied & interdisciplinary statistics. Of course many of the best papers will touch on more than one of these general areas, because the discipline of statistics has deep roots in mathematics, and in substantive scientific fields.