Semiparametric Density Deconvolution |
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Authors: | MARTIN L. HAZELTON BERWIN A. TURLACH |
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Affiliation: | Institute of Fundamental Sciences, Massey University; School of Mathematics and Statistics, University of Western Australia and Department of Statistics and Applied Probability, National University of Singapore |
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Abstract: | Abstract. A new semiparametric method for density deconvolution is proposed, based on a model in which only the ratio of the unconvoluted to convoluted densities is specified parametrically. Deconvolution results from reweighting the terms in a standard kernel density estimator, where the weights are defined by the parametric density ratio. We propose that in practice, the density ratio be modelled on the log-scale as a cubic spline with a fixed number of knots. Parameter estimation is based on maximization of a type of semiparametric likelihood. The resulting asymptotic properties for our deconvolution estimator mirror the convergence rates in standard density estimation without measurement error when attention is restricted to our semiparametric class of densities. Furthermore, numerical studies indicate that for practical sample sizes our weighted kernel estimator can provide better results than the classical non-parametric kernel estimator for a range of densities outside the specified semiparametric class. |
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Keywords: | bandwidth contaminated data density estimation Kullback–Leibler measurement error spline |
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