We consider the problem of pricing European exotic path-dependent derivatives on an underlying described by the Heston stochastic volatility model. Lipton has found a closed form integral representation of the joint transition probability density function of underlying price and variance in the Heston model. We give a convenient numerical approximation of this formula and we use the obtained approximated transition probability density function to price discrete path-dependent options as discounted expectations. The expected value of the payoff is calculated evaluating an integral with the Monte Carlo method using a variance reduction technique based on a suitable approximation of the transition probability density function of the Heston mod...
The Heston model is a partial differential equation which is used to price options and is a further ...
In this thesis I combine the strengths of the Path Integration method and the Fast Fourier transform...
International audienceThere is a need for very fast option pricers when the financial objects are mo...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying desc...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
Abstract The stochastic volatility model of Heston [6] has been accepted by many practitioners for p...
We focus on closed-form option pricing in Hestons stochastic volatility model, where closedform form...
This paper presents a numerical method to price European options on realized variance. A European re...
We present a path integral method to derive closed-form solutions for option prices in a stochastic ...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
Heston (1993) presents a method to derive a closed-form solution for derivative pricing when the vol...
We propose a new, data-driven approach for efficient pricing of - fixed- and float-strike - discrete...
none4siWe propose a novel algorithm which allows to sample paths from an underlying price process in...
The Heston model is a partial differential equation which is used to price options and is a further ...
In this thesis I combine the strengths of the Path Integration method and the Fast Fourier transform...
International audienceThere is a need for very fast option pricers when the financial objects are mo...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying desc...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
Abstract The stochastic volatility model of Heston [6] has been accepted by many practitioners for p...
We focus on closed-form option pricing in Hestons stochastic volatility model, where closedform form...
This paper presents a numerical method to price European options on realized variance. A European re...
We present a path integral method to derive closed-form solutions for option prices in a stochastic ...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
Heston (1993) presents a method to derive a closed-form solution for derivative pricing when the vol...
We propose a new, data-driven approach for efficient pricing of - fixed- and float-strike - discrete...
none4siWe propose a novel algorithm which allows to sample paths from an underlying price process in...
The Heston model is a partial differential equation which is used to price options and is a further ...
In this thesis I combine the strengths of the Path Integration method and the Fast Fourier transform...
International audienceThere is a need for very fast option pricers when the financial objects are mo...