Fractional Brownian motion (FBM) with Hurst index 1/2 < H < 1 is not a semimartingale. Consequently, the standard It calculus is not available for stochastic integrals with respect to FBM as an integrator if 1/2 < H < 1. In this paper we derive a version of It’s formula for fractional Brownian motion. Then, as an application, we propose and study a fractional Brownian Scholes stochastic model which includes the standard Black-Scholes model as a special case and is able to account for long range dependence in modeling the price of a risky asset. This article is dedicated to the memory of Roland L. Dobrushin
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
In recent years, there has been a great interest in modelling financial markets using fractional Bro...
Abstract. The possibility to extend the classical Ito's construction of stochastic integrals is...
Traditional financial modeling is based on semimartingale processes with stationary and independent ...
We introduce the stochastic integration with respect to the infinite-dimensional frac-tional Brownia...
The theory of fractional Brownian motion and other long-memory processes are addressed in this volum...
In this paper a stochastic calculus is given for the fractional Brownian motions that have the Hurst...
AbstractThe aim of this paper is to provide a semimartingale approximation of a fractional stochasti...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
We give a survey of the stochastic calculus of fractional Brownian motion, and we discuss its applic...
In this thesis, I investigate the properties of fractional Brownian motion for use in the stock mar...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
We introduce the stochastic integration with respect to the infinite-dimensional fractional Brownian...
We present new theoretical results on the fractional Brownian motion, including different definition...
The Generalized fractional Brownian motion (gfBm) is a stochastic process that acts as a generalizat...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
In recent years, there has been a great interest in modelling financial markets using fractional Bro...
Abstract. The possibility to extend the classical Ito's construction of stochastic integrals is...
Traditional financial modeling is based on semimartingale processes with stationary and independent ...
We introduce the stochastic integration with respect to the infinite-dimensional frac-tional Brownia...
The theory of fractional Brownian motion and other long-memory processes are addressed in this volum...
In this paper a stochastic calculus is given for the fractional Brownian motions that have the Hurst...
AbstractThe aim of this paper is to provide a semimartingale approximation of a fractional stochasti...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
We give a survey of the stochastic calculus of fractional Brownian motion, and we discuss its applic...
In this thesis, I investigate the properties of fractional Brownian motion for use in the stock mar...
The aim of this work is to establish and generalize a relationship between fractional partial differ...
We introduce the stochastic integration with respect to the infinite-dimensional fractional Brownian...
We present new theoretical results on the fractional Brownian motion, including different definition...
The Generalized fractional Brownian motion (gfBm) is a stochastic process that acts as a generalizat...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
In recent years, there has been a great interest in modelling financial markets using fractional Bro...
Abstract. The possibility to extend the classical Ito's construction of stochastic integrals is...