Abstract
A nonparametric probability density estimator is proposed that is optimal with respect to a discretized form of a continuous penalized-likelihood criterion functional. Approximation results relating the discrete estimator to the estimate obtained by solving the corresponding infinite-dimensional problem are presented. The discrete estimator is shown to be consistent. The numerical implementation of this discrete estimator is outlined and examples displayed. A simulation study compares the integrated mean square error of the discrete estimator with that of the well-known kernel estimators. Asymptotic rates of convergence of the discrete estimator are also investigated.
Citation
D. W. Scott. R. A. Tapia. J. R. Thompson. "Nonparametric Probability Density Estimation by Discrete Maximum Penalized- Likelihood Criteria." Ann. Statist. 8 (4) 820 - 832, July, 1980. https://doi.org/10.1214/aos/1176345074
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