Xiulian Gao scite author profile

Xiulian Gao

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Dezhou University

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Efficient Estimation for the Derivative of Nonparametric Function by Optimally Combining Quantile Information

et al. 2021

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In this article, we focus on the efficient estimators of the derivative of the nonparametric function in the nonparametric quantile regression model. We develop two ways of combining quantile regression information to derive the estimators. One is the weighted composite quantile regression estimator based on the quantile weighted loss function; the other is the weighted quantile average estimator based on the weighted average of quantile regression estimators at a single quantile. Furthermore, by minimizing the asymptotic variance, the optimal weight vector is computed, and consequently, the optimal estimator is obtained. Furthermore, we conduct some simulations to evaluate the performance of our proposed estimators under different symmetric error distributions. Simulation studies further illustrate that both estimators work better than the local linear least square estimator for all the symmetric errors considered except the normal error, and the weighted quantile average estimator performs better than the weighted composite quantile regression estimator in most situations.

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Nonparametric Estimation Method for Array Acoustic Dispersion Information

Zhou¹,

Shen²,

Li³

et al. 2021

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Xiulian Gao

Efficient Estimation for the Derivative of Nonparametric Function by Optimally Combining Quantile Information

Nonparametric Estimation Method for Array Acoustic Dispersion Information

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