Add to ORKGTraditional financial modeling is based on semimartingale processes with stationary and independent increments. However, empirical investigations on financial data does not always support these assumptions. This contradiction showed that there is a need for new stochastic models. Fractional Brownian motion (fBm) was proposed as one of these models by Benoit Mandelbrot. FBm is the only continuous Gaussian process with dependent increments. Correlation between increments of a fBm changes according to its self-similarity parameter H. This property of fBm helps to capture the correlation dynamics of the data and consequently obtain better forecast results. But for values of H different than 1/2, fBm is not a semimartingale and classical Ito for...
The purpose of this work is the analysis of financial models, especially for option pricing, interes...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
Two applications of the fractional Brownian motion will be presented. First, we study the time-regul...
Fractional Brownian motion (FBM) with Hurst index 1/2 < H < 1 is not a semimartingale. Consequ...
In recent years, the field of Fractional Brownian motion, Fractional Gaussian noise and long-range d...
An important research area in financial mathematics is the study of long memory phenomenon in financ...
The theory of fractional Brownian motion and other long-memory processes are addressed in this volum...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
Title: Stochastic Models in Financial Mathematics Author: Bc. Oliver Waczulík Department: Department...
In this thesis, I investigate the properties of fractional Brownian motion for use in the stock mar...
This thesis is about fractional processes, their pathwise stochastic analysis and financial applicat...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
The definitive version is available at www.blackwell-synergy.comWe present a new framework for fract...
Stock exchange dynamics of fractional order are usually modeled as a non-random exponential growth p...
The Generalized fractional Brownian motion (gfBm) is a stochastic process that acts as a generalizat...
The purpose of this work is the analysis of financial models, especially for option pricing, interes...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
Two applications of the fractional Brownian motion will be presented. First, we study the time-regul...
Fractional Brownian motion (FBM) with Hurst index 1/2 < H < 1 is not a semimartingale. Consequ...
In recent years, the field of Fractional Brownian motion, Fractional Gaussian noise and long-range d...
An important research area in financial mathematics is the study of long memory phenomenon in financ...
The theory of fractional Brownian motion and other long-memory processes are addressed in this volum...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
Title: Stochastic Models in Financial Mathematics Author: Bc. Oliver Waczulík Department: Department...
In this thesis, I investigate the properties of fractional Brownian motion for use in the stock mar...
This thesis is about fractional processes, their pathwise stochastic analysis and financial applicat...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
The definitive version is available at www.blackwell-synergy.comWe present a new framework for fract...
Stock exchange dynamics of fractional order are usually modeled as a non-random exponential growth p...
The Generalized fractional Brownian motion (gfBm) is a stochastic process that acts as a generalizat...
The purpose of this work is the analysis of financial models, especially for option pricing, interes...
Geometric fractional Brownian motion (GFBM) is an extended model of the traditional geometric Browni...
Two applications of the fractional Brownian motion will be presented. First, we study the time-regul...