Local stationarity and simulation of self-affine intrinsic random functions

Author

Stein, Michael L.

Author_Institution

Dept. of Stat., Chicago Univ., IL, USA

Volume

47

Issue

4

fYear

2001

fDate

5/1/2001 12:00:00 AM

Firstpage

1385

Lastpage

1390

Abstract

Gaussian intrinsic random functions with power law generalized covariance functions, which in one dimension essentially correspond to fractional and integrated fractional Brownian motions, form a class of self-affine models for random fields with a wide range of smoothness properties. These random fields are nonstationary, but appropriately filtered versions of them are stationary. This work proves that most such random functions are locally stationary in a certain well-defined sense. This result yields an efficient and exact method of simulating all fractional and integrated fractional Brownian motions

Keywords

Brownian motion; covariance analysis; random functions; smoothing methods; Gaussian intrinsic random functions; efficient method; exact method; fractional Brownian motion; integrated fractional Brownian motion; local stationarity; nonstationary random fields; power law generalized covariance functions; self-affine intrinsic random functions; self-affine models; simulation; smoothness properties; Automatic logic units; Brownian motion; Fourier transforms; Nonlinear filters; Polynomials; Probability; Statistics; Stochastic processes; Turning;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/18.923722

Filename

923722