summary:The paper presents a discontinuous Galerkin method for solving partial integro-differential equations arising from the European as well as American option pricing when the underlying asset follows an exponential variance gamma process. For practical purposes of numerical solving we introduce the modified option pricing problem resulting from a localization to a bounded domain and an approximation of small jumps, and we discuss the related error estimates. Then we employ a robust numerical procedure based on piecewise polynomial generally discontinuous approximations in the spatial domain. This technique enables a simple treatment of the American early exercise constraint by a direct encompassing it as an additional nonlinear source ...
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
Option pricing models are an important part of financial markets worldwide. The PDE formulation of t...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
summary:The paper presents a discontinuous Galerkin method for solving partial integro-differential ...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Efficient numerical methods for option pricing is an active field of research. This project has the ...
The modern theory of option pricing is based on models introduced almost 50 years ago. These models,...
Asian options represent an important subclass of the path-dependent contracts that are identified by...
Stochastic volatility models are a variance extension of the classical Black-Scholes model dynamics ...
summary:The evaluation of option premium is a very delicate issue arising from the assumptions made ...
This paper deals with pricing of European and American options, when the underlying asset price foll...
When underlying financial variables follow a Markov jump-diffusion process, the value function of a ...
summary:Option pricing models are an important part of financial markets worldwide. The PDE formulat...
Option pricing models are an important part of financial markets worldwide. The PDE formulation of t...
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
Option pricing models are an important part of financial markets worldwide. The PDE formulation of t...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
summary:The paper presents a discontinuous Galerkin method for solving partial integro-differential ...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Under real market conditions, there exist many cases when it is inevitable to adopt numerical approx...
Efficient numerical methods for option pricing is an active field of research. This project has the ...
The modern theory of option pricing is based on models introduced almost 50 years ago. These models,...
Asian options represent an important subclass of the path-dependent contracts that are identified by...
Stochastic volatility models are a variance extension of the classical Black-Scholes model dynamics ...
summary:The evaluation of option premium is a very delicate issue arising from the assumptions made ...
This paper deals with pricing of European and American options, when the underlying asset price foll...
When underlying financial variables follow a Markov jump-diffusion process, the value function of a ...
summary:Option pricing models are an important part of financial markets worldwide. The PDE formulat...
Option pricing models are an important part of financial markets worldwide. The PDE formulation of t...
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
Option pricing models are an important part of financial markets worldwide. The PDE formulation of t...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...