Beschreibung
This book presents a study of statistical inferences based on the kernel-type estimators of distribution functions. The inferences involve matters such as quantile estimation, nonparametric tests, and mean residual life expectation, to name just some. Convergence rates for the kernel estimators of density functions are slower than ordinary parametric estimators, which have root-n consistency. If the appropriate kernel function is used, the kernel estimators of the distribution functions recover the root-n consistency, and the inferences based on kernel distribution estimators have root-n consistency. Further, the kernel-type estimator produces smooth estimation results. The estimators based on the empirical distribution function have discrete distribution, and the normal approximation cannot be improved-that is, the validity of the Edgeworth expansion cannot be proved. If the support of the population density function is bounded, there is a boundary problem, namely the estimator does not have consistency near the boundary. The book also contains a study of the mean squared errors of the estimators and the Edgeworth expansion for quantile estimators.
Autorenporträt
Rizky Reza Fauzi: His major field is mathematical statistics, and he got Ph.D. in 2020. He has good skill of mathematics and published 4 papers. He will be one of the leading researchers in Indonesia.Yoshihiko Maesono: He published about 50 papers which study nonparametric inference. In the last 20 years, he has been studying kernel-type estimation and obtained new theoretical results, especially the methods based on kernel estimation of the distribution function.
