Quadratic variations for Gaussian isotropic random fields on the sphere

Abstract

In this paper we define (empirical) quadratic variations for a Gaussian isotropic random field f on a unit sphere as sums over equidistant increments on one single geodesic line on the surface of the sphere. We prove a noncentral limit theorem for a fixed Fourier component of such a field as well as quantitative central limit theorems in the increasing frequency regime. Based on these results we propose estimators of the angular power spectrum and study their properties. Moreover, we show a quantitative central limit theorem for quadratic variations over the field f and construct an estimator for the Hurst parameter of a L2( S2)-valued fractional Brownian motion.