• Journal of the Korean Data and Information Science Society
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• 제25권4호
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• pp.951-959
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• 2014

Recently Hazelton and Turlach (2009) proposed a weighted kernel density estimator for the deconvolution problem. In the case of Gaussian kernels and measurement error, they argued that the weighted kernel density estimator is a competitive estimator over the classical deconvolution kernel estimator. In this paper we consider weighted kernel density estimators when sample observations are contaminated by double exponentially distributed errors. The performance of the weighted kernel density estimators is compared over the classical deconvolution kernel estimator and the kernel density estimator based on the support vector regression method by means of a simulation study. The weighted density estimator with the Gaussian kernel shows numerical instability in practical implementation of optimization function. However the weighted density estimates with the double exponential kernel has very similar patterns to the classical kernel density estimates in the simulations, but the shape is less satisfactory than the classical kernel density estimator with the Gaussian kernel.

• Communications for Statistical Applications and Methods
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• 제17권3호
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• pp.451-457
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• 2010

This paper considers the problem of nonparametric deconvolution density estimation when sample observa-tions are contaminated by double exponentially distributed errors. Three different deconvolution density estima-tors are introduced: a weighted kernel density estimator, a kernel density estimator based on the support vector regression method in a RKHS, and a classical kernel density estimator. The performance of these deconvolution density estimators is compared by means of a simulation study.

• 대한수학회지
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• 제44권3호
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• pp.525-539
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• 2007

Consider the regression model $Y_i=g(x_i)+e_i\;for\;i=1,\;2,\;{\ldots},\;n$, where: (1) $x_i$ are fixed design points, (2) $e_i$ are independent random errors with mean zero, (3) g($\cdot$) is unknown regression function defined on [0, 1]. Under $Y_i$ are censored randomly, we discuss the asymptotic normality of the weighted kernel estimators of g when the censored distribution function is known or unknown.

• Journal of the Korean Statistical Society
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• 제24권2호
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• pp.349-360
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• 1995

This paper deals with the robustness properties of the minimum disparity estimation in linear regression models. The estimators defined as statistical quantities whcih minimize the blended weight Hellinger distance between a weighted kernel density estimator of the residuals and a smoothed model density of the residuals. It is shown that if the weights of the density estimator are appropriately chosen, the estimates of the regression parameters are robust.

• Journal of the Korean Data and Information Science Society
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• 제25권1호
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• pp.87-95
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• 2014

분산함수가 불연속인 경우 Kang과 Huh (2006)는 잔차제곱을 이용한 Nadaraya-Watson 추정량으로 분산함수를 추정하였다. 음의 실수 값도 가질 수 있는 로그분산함수를 추정 대상으로 하여, 오차제곱의 분포를 ${\chi}^2$-분포로 가정하고 국소선형적합을 이용한 불연속 로그분산함수의 추정이 Huh(2013)에 의해 연구되었다. Chen 등 (2009)은 연속인 로그분산함수를 로그잔차제곱을 이용한 국소선형적합으로 추정하였다. 본 연구는 Chen 등의 추정법을 이용하여 불연속인 로그분산함수의 추정량을 제시하였다. 기존의 제안된 불연속인 로그분산함수의 추정량들과 제안된 추정량을 모의실험을 통하여 비교연구하고자 한다. 한편, 로그분산함수가 연속이지만 그 미분된 함수가 불연속일 경우, Huh (2013)의 방법과 제안된 방법으로 적합된 국소선형의 기울기를 이용하여 불연속인 미분된 로그 분산함수의 추정량을 제시하고자 한다. 이들 추정량의 비교 연구 또한 모의실험을 통하여 제시하고자 한다.