Supplement to properties and numerical evaluation of the Rosenblatt distribution
Files
Accepted manuscript
Date
2013-08
Authors
Veillette, Mark S.
Taqqu, Murad S.
Version
OA Version
Citation
Mark S Veillette, Murad S Taqqu. 2013. "Supplement to Properties and numerical evaluation of the Rosenblatt distribution." Bernoulli, v. 19, pp. 982 - 1005. https://doi.org/10.3150/12-BEJ421
Abstract
This paper studies various distributional properties of the Rosenblatt distribution. We begin by describing a technique for computing the cumulants. We then study the expansion of the Rosenblatt distribution in terms of shifted chi-squared distributions. We derive the coefficients of this expansion and use these to obtain the Lévy–Khintchine formula and derive asymptotic properties of the Lévy measure. This allows us to compute the cumulants, moments, coefficients in the chi-square expansion and the density and cumulative distribution functions of the Rosenblatt distribution with a high degree of precision. Tables are provided and software written to implement the methods described here is freely available by request from the authors.