Linear fractional stable motion: a wavelet estimator of the parameter

Abstract

Linear fractional stable motion, denoted by \XH,(t)\t∈ , is one of the most classical stable processes; it depends on two parameters H∈ (0,1) and ∈ (0,2). The parameter H characterizes the self-similarity property of \XH,(t)\t∈ while the parameter governs the tail heaviness of its finite dimensional distributions; throughout our article we assume that the latter distributions are symmetric, that H>1/ and that H is known. We show that, on the interval [0,1], the asymptotic behaviour of the maximum, at a given scale j, of absolute values of the wavelet coefficients of \XH,(t)\t∈ , is of the same order as 2-j(H-1/); then we derive from this result a strongly consistent (i.e. almost surely convergent) statistical estimator for the parameter .