内生性回归量中连续位置移位的非参数结构估计

P. Phillips, Liangjun Su
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引用次数: 7

摘要

Wang和Phillips (2009b, c)最近的工作表明,在非平稳非参数回归中不会出现病态逆问题,并且不需要非参数工具变量估计。相反,一个(可能是非线性的)协整回归方程的简单Nadaraya Watson非参数估计与一个极限(混合)正态分布是一致的,而不考虑回归量的内质性、回归量的近积分和积分以及回归方程中的序列依赖性。本文表明,对于具有独立数据的结构非参数回归,当回归量中存在连续的位置移位时,一些密切相关的结果也适用。在这种情况下,位置变化作为追踪回归线的工具变量,类似于协整回归中回归量的随机游走性质。给出了局部水平和局部线性非参数估计的渐近理论,探讨了与非平稳协整回归理论和非参数IV回归的联系,并给出了对平稳强混合情况的推广。与标准的非参数极限理论相比,局部水平估计量和局部线性估计量具有相同的极限分布,因此局部线性方法在本文中没有明显的优势。我们发现了一些有趣的情况,这在文献中似乎是新的,其中非参数估计是一致的,而参数回归是不一致的,即使真正的(参数)回归函数是已知的。将这些方法进一步应用于具有内生回归因子和个体效应的结构面板数据模型的非参数估计的极限理论。报道了一些仿真证据。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Nonparametric Structural Estimation Via Continuous Location Shifts in an Endogenous Regressor
Recent work by Wang and Phillips (2009b, c) has shown that ill posed inverse problems do not arise in nonstationary nonparametric regression and there is no need for nonparametric instrumental variable estimation. Instead, simple Nadaraya Watson nonparametric estimation of a (possibly nonlinear) cointegrating regression equation is consistent with a limiting (mixed) normal distribution irrespective of the endogeneity in the regressor, near integration as well as integration in the regressor, and serial dependence in the regression equation. The present paper shows that some closely related results apply in the case of structural nonparametric regression with independent data when there are continuous location shifts in the regressor. In such cases, location shifts serve as an instrumental variable in tracing out the regression line similar to the random wandering nature of the regressor in a cointegrating regression. Asymptotic theory is given for local level and local linear nonparametric estimators, links with nonstationary cointegrating regression theory and nonparametric IV regression are explored, and extensions to the stationary strong mixing case are given. In contrast to standard nonparametric limit theory, local level and local linear estimators have identical limit distributions, so the local linear approach has no apparent advantage in the present context. Some interesting cases are discovered, which appear to be new in the literature, where nonparametric estimation is consistent whereas parametric regression is inconsistent even when the true (parametric) regression function is known. The methods are further applied to establish a limit theory for nonparametric estimation of structural panel data models with endogenous regressors and individual effects. Some simulation evidence is reported.
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