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切片平均方差估计的渐近性质

Asymptotics for sliced average variance estimation

Annals of Statistics · 2007
被引 0
ABS 4*

中文导读

研究了切片平均方差估计(SAVE)的相合性,发现连续响应时SAVE不如切片逆回归(SIR)稳健,需偏差校正才能达到根号n相合;离散响应时则可直接实现根号n相合。

Abstract

In this paper, we systematically study the consistency of sliced average variance estimation (SAVE). The findings reveal that when the response is continuous, the asymptotic behavior of SAVE is rather different from that of sliced inverse regression (SIR). SIR can achieve $\sqrt{n}$ consistency even when each slice contains only two data points. However, SAVE cannot be $\sqrt{n}$ consistent and it even turns out to be not consistent when each slice contains a fixed number of data points that do not depend on n, where n is the sample size. These results theoretically confirm the notion that SAVE is more sensitive to the number of slices than SIR. Taking this into account, a bias correction is recommended in order to allow SAVE to be $\sqrt{n}$ consistent. In contrast, when the response is discrete and takes finite values, $\sqrt{n}$ consistency can be achieved. Therefore, an approximation through discretization, which is commonly used in practice, is studied. A simulation study is carried out for the purposes of illustration.

统计学计量经济学降维方法