Add to ORKGInternational audienceStochastic volatility models can be seen as a particular family of two-dimensional stochastic differential equations (SDE) in which the volatility process follows an autonomous one-dimensional SDE. We take advantage of this structure to propose an efficient discretization scheme with order two of weak convergence. We prove that the order two holds for the asset price and not only for the log-asset as usually found in the literature. Numerical experiments confirm our theoretical result and we show the superiority of our scheme compared to the Euler scheme, with or without Romberg extrapolation
AbstractWeak local linear (WLL) discretizations are playing an increasing role in the construction o...
The purpose of this paper is to study the efficiency of simplified weak schemes for stochastic diffe...
International audienceInspired by recent advances in the theory of modified differential equations, ...
In usual stochastic volatility models, the process driving the volatility of the asset price evolves...
Models based on SDEs have applications in many disciplines, but in pratical applications calculating...
In the present paper, we first deal with the discretization of stochastic differential equ...
Weak approximations have been developed to calculate the value of func-tionals of stochastic differe...
Abstract. A general procedure to construct weak methods for the numerical solution of stochas-tic di...
We consider a class of stochastic path-dependent volatility models where the stochastic volatility, ...
The purpose of this paper is to study the efficiency of simplified weak schemes for stochastic diffe...
We present high-order compact schemes for a linear second-order parabolic partial differential equat...
The purpose of this paper is to measure the strong and weak order of convergence of both the Euler a...
We consider a general class of high order weak approximation schemes for stochastic differential equ...
WEAK CONVERGENCE OF A NUMERICAL SCHEME FOR STOCHASTIC DIFFERENTIAL EQUATIONSIn this paper a n...
A new explicit stochastic Runge-Kutta scheme of weak order 2 is proposed fornon-commuting stochastic...
AbstractWeak local linear (WLL) discretizations are playing an increasing role in the construction o...
The purpose of this paper is to study the efficiency of simplified weak schemes for stochastic diffe...
International audienceInspired by recent advances in the theory of modified differential equations, ...
In usual stochastic volatility models, the process driving the volatility of the asset price evolves...
Models based on SDEs have applications in many disciplines, but in pratical applications calculating...
In the present paper, we first deal with the discretization of stochastic differential equ...
Weak approximations have been developed to calculate the value of func-tionals of stochastic differe...
Abstract. A general procedure to construct weak methods for the numerical solution of stochas-tic di...
We consider a class of stochastic path-dependent volatility models where the stochastic volatility, ...
The purpose of this paper is to study the efficiency of simplified weak schemes for stochastic diffe...
We present high-order compact schemes for a linear second-order parabolic partial differential equat...
The purpose of this paper is to measure the strong and weak order of convergence of both the Euler a...
We consider a general class of high order weak approximation schemes for stochastic differential equ...
WEAK CONVERGENCE OF A NUMERICAL SCHEME FOR STOCHASTIC DIFFERENTIAL EQUATIONSIn this paper a n...
A new explicit stochastic Runge-Kutta scheme of weak order 2 is proposed fornon-commuting stochastic...
AbstractWeak local linear (WLL) discretizations are playing an increasing role in the construction o...
The purpose of this paper is to study the efficiency of simplified weak schemes for stochastic diffe...
International audienceInspired by recent advances in the theory of modified differential equations, ...