The Heston stochastic volatility model is one extension of the Black-Scholes model which describes the money markets more accurately so that more realistic prices for derivative products are obtained. From the stochastic differential equation of the underlying financial product a partial differential equation (p.d.e.) for the value function of an option can be derived. This p.d.e. can be solved with the finite difference method (f.d.m.). The stability and consistency of the method is examined. Furthermore a boundary condition is proposed to reduce the numerical error. Finally a non uniform structured grid is derived which is fairly optimal for the numerical result in the most interesting point.Das stochastische Volatilitaetsmodell von Hesto...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
This paper provides an overview of the finite difference method and its application to approximating...
The Heston model is a partial differential equation which is used to price options and is a further ...
The Uncertain Volatility model is a non-linear generalisation of the Black-Scholes model in the sens...
The thesis on option pricing by finite difference methods focuses on the numerical methods used to p...
Abstract. We propose a pricing method for derivatives when the underlying diffusion is given by a se...
This paper studies an effective finite difference scheme for solving two-dimensional Heston stochast...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
The Heston stochastic volatility model is one extension of the Black-Scholes model which describes t...
This paper provides an overview of the finite difference method and its application to approximating...
The Heston model is a partial differential equation which is used to price options and is a further ...
The Uncertain Volatility model is a non-linear generalisation of the Black-Scholes model in the sens...
The thesis on option pricing by finite difference methods focuses on the numerical methods used to p...
Abstract. We propose a pricing method for derivatives when the underlying diffusion is given by a se...
This paper studies an effective finite difference scheme for solving two-dimensional Heston stochast...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...
Now a days mathematics can be used for many different purposes or topics, and every day new fields t...