Dimensional Properties of Fractional Brownian Motion

## Abstract Fractal Brownian motion, also called fractional Brownian motion (fBm), is a class of stochastic processes characterized by a single parameter called the Hurst parameter, which is a real number between zero and one. fBm becomes ordinary standard Brownian motion when the parameter has the

A new and short proof of existence of the fractional Brownian ÿeld with exponent =2; ∈ (0; 2], is given in terms of the fractional power of the Laplacian.

In this paper some results for a stochastic calculus for a fractional Brownian motion are described. Some applications of this calculus are given. Some results of a spectral approach to fractional Gaussian noise, the formal derivative of fractional Brownian motion, are given.

We consider the approximation of a fractional Brownian motion by a wavelet series expansion at resolution 2 -l . The approximation error is measured in the integrated mean squared sense over finite intervals and we obtain its expansion as a sum of terms with increasing rates of convergence. The depe