Asymptotic Efficiency of Joint Estimator Relative to Two-Stage Estimator Under Misspecified Likelihoods

Doosoo Kim
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Abstract

The two-stage estimator is often more tractable when there are nuisance parameters that can be separately estimated and plugged into an objective function. The joint estimator tends to bear the higher computational cost since it estimates all parameters in one stage by optimizing the sum of objective functions used in the two stages. It is well-known that the joint estimator is asymptotically more efficient than the two-stage estimator if the objective function is the true log-likelihood. When the objective function is not the true log-likelihood, I show that the relative asymptotic efficiency of the joint estimator still holds under a finite number of testable moment conditions. The implications of the main result on models based on quasi-limited information likelihoods are discussed.
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联合估算器相对于两阶段估算器的渐近效率(在未指定的似然条件下
当存在可分别估算并插入目标函数的干扰参数时,两阶段估算法往往更为简便。联合估计法往往计算成本较高,因为它通过优化两个阶段所用目标函数之和,在一个阶段内估计所有参数。众所周知,如果目标函数是真实的对数似然,联合估计法在渐近上比两阶段估计法更有效。当目标函数不是真实对数似然时,我证明了在有限数量的可检验矩条件下,联合估计器的相对渐近效率仍然成立。本文还讨论了主要结果对基于准有限信息似然的模型的影响。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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