Kernel entropy estimation for linear processes

Abstract

Let \Xn: n∈ N\ be a linear process with bounded probability density function f(x). We study the estimation of the quadratic functional ∫R f2(x)\, dx. With a Fourier transform on the kernel function and the projection method, it is shown that, under certain mild conditions, the estimator \[ 2n(n-1)hn Σ1 i<j nK(Xi-Xjhn) \] has similar asymptotical properties as the i.i.d. case studied in Gin\'e and Nickl (2008) if the linear process \Xn: n∈ N\ has the defined short range dependence. We also provide an application to L22 divergence and the extension to multivariate linear processes. The simulation study for linear processes with Gaussian and α-stable innovations confirms our theoretical results. As an illustration, we estimate the L22 divergences among the density functions of average annual river flows for four rivers and obtain promising results.