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Kernel density estimation for circular data: a Fourier series-based plug-in approach for bandwidth selection

Carlos Tenreiro

2022Journal of nonparametric statistics15 citationsDOIOpen Access PDF

Abstract

In this paper, we derive asymptotic expressions for the mean integrated squared error of a class of delta sequence density estimators for circular data. This class includes the class of kernel density estimators usually considered in the literature, as well as a new class that is closer in spirit to the class of Parzen–Rosenblatt estimators for linear data. For these two classes of kernel density estimators, a Fourier series-based direct plug-in approach for bandwidth selection is presented. The proposed bandwidth selector has a n−1/2 relative convergence rate whenever the underlying density is smooth enough and the simulation results testify that it presents a very good finite sample performance against other bandwidth selectors in the literature.

Topics & Concepts

EstimatorMathematicsKernel density estimationBandwidth (computing)Fourier seriesKernel (algebra)Density estimationApplied mathematicsRate of convergenceVariable kernel density estimationMultivariate kernel density estimationAlgorithmSeries (stratigraphy)Mathematical optimizationKernel methodStatisticsComputer scienceMathematical analysisArtificial intelligenceDiscrete mathematicsPaleontologyChannel (broadcasting)Computer networkBiologySupport vector machineBayesian Methods and Mixture ModelsStatistical Methods and Inference