In this paper, we suggest a jump diffusion model in markets during financial crisis. Using risk-neutral pricing, we derive a partial differential equation (P.D.E.) for the prices of European options. We find a closed form solution of the P.D.E. in the particular case where the stock price is too large. Then, we use such a solution as a boundary condition in the numerical treatment of the P.D.E. for any range of stock price. The numerical method adopted is the unconditionally stable Crank-Nicolson method. Illustrative examples are presented
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
In this survey we shall focus on the following issues related to jump-diffusion mod-els for asset pr...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
AbstractIn this paper we find numerical solutions for the pricing problem in jump diffusion markets....
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Market crashes often appear in daily trading activities and such instantaneous occurring events woul...
Abstract. This paper discusses extensions of the implied diffusion approach of Dupire (1994) to asse...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
We propose a stochastic volatility jump-diffusion model for option pricing with contemporaneous jump...
Jump-diffusions are a class of models that is used to model the price dynamics of assets whose value...
The shortcomings of diffusion models in representing the risk related to large market movements have...
This paper presents a model for option pricing in markets that experience financial crashes. The sto...
We discuss a number of numerical methods that approximate the solution of the Partial Integro Differ...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
In this survey we shall focus on the following issues related to jump-diffusion mod-els for asset pr...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
AbstractIn this paper we find numerical solutions for the pricing problem in jump diffusion markets....
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Market crashes often appear in daily trading activities and such instantaneous occurring events woul...
Abstract. This paper discusses extensions of the implied diffusion approach of Dupire (1994) to asse...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
We propose a stochastic volatility jump-diffusion model for option pricing with contemporaneous jump...
Jump-diffusions are a class of models that is used to model the price dynamics of assets whose value...
The shortcomings of diffusion models in representing the risk related to large market movements have...
This paper presents a model for option pricing in markets that experience financial crashes. The sto...
We discuss a number of numerical methods that approximate the solution of the Partial Integro Differ...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
Most of the recent literature dealing with the modeling of financial assets assumes that the underly...
In this survey we shall focus on the following issues related to jump-diffusion mod-els for asset pr...