Higher-Order Asymptotic Properties of Kernel Density Estimator with Global Plug-In and Its Accompanying Pilot Bandwidth

Abstract

This study investigates the effect of bandwidth selection via a plug-in method on the asymptotic structure of the nonparametric kernel density estimator. We generalise the result of Hall and Kang (2001) and find that the plug-in method has no effect on the asymptotic structure of the estimator up to the order of O\(nh0)-1/2+h0L\=O(n-L/(2L+1)) for a bandwidth h0 and any kernel order L when the kernel order for pilot estimation Lp is high enough. We also provide the valid Edgeworth expansion up to the order of O\(nh0)-1+h02L\ and find that, as long as the Lp is high enough , the plug-in method has an effect from on the term whose convergence rate is O\(nh0)-1/2h0+h0L+1\=O(n-(L+1)/(2L+1)). In other words, we derive the exact achievable convergence rate of the deviation between the distribution functions of the estimator with a deterministic bandwidth and with the plug-in bandwidth. In addition, we weaken the conditions on kernel order Lp for pilot estimation by considering the effect of pilot bandwidth associated with the plug-in bandwidth. We also show that the bandwidth selection via the global plug-in method possibly has an effect on the asymptotic structure even up to the order of O\(nh0)-1/2+h0L\. Finally, Monte Carlo experiments are conducted to see whether our approximation improves previous results.