Add to ORKGThe submitted work deals with option pricing. Mathematical approach is immediately followed by an economic interpretation. The main problem is to model the underlying uncertainities driving the stock price. Using two well-known valuation models, binomial model and Black-Scholes model, we explain basic principles, especially risk neutral pricing. Due to the empirical biases new models have been developped, based on pure jump process. Variance gamma process and its special symmetric case are presented
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
We reformulate the Lévy-Kintchine formula to make it suitable for modelling the stochastic time-chan...
This paper studies the equity premium and option pricing under the general equilibrium framework tak...
The submitted work deals with option pricing. Mathematical approach is immediately followed by an ec...
Variance Gamma process is a three parameter process which generalizes the geomet-ric Brownian motion...
This dissertation reports on a study of the pricing of European, Bermudan and American put options w...
Aim of this diploma thesis is to use Variance Gamma process in the option pricing model and compare ...
We introduce a pricing model for equity options in which sample paths follow a variance-gamma (VG) j...
The purpose of this article is to introduce a new L\'evy process, termed Variance Gamma++ process, t...
The methodology of pricing financial derivatives, particularly stock options, was first introduced b...
In this paper, we test the three-parameter symmetric variance gamma (SVG) option pricing model and t...
We use a multivariate variance gamma process developed by Jun Wang (2009) and a similarly constructe...
We apply the variance-gamma (VG) option-pricing model to currency options. The model is a pure infin...
This article reviews a pricing model, suitable for variance-gamma jump processes, based on the metho...
Derivative pricing, and in particular the pricing of options, is an important area of current resear...
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
We reformulate the Lévy-Kintchine formula to make it suitable for modelling the stochastic time-chan...
This paper studies the equity premium and option pricing under the general equilibrium framework tak...
The submitted work deals with option pricing. Mathematical approach is immediately followed by an ec...
Variance Gamma process is a three parameter process which generalizes the geomet-ric Brownian motion...
This dissertation reports on a study of the pricing of European, Bermudan and American put options w...
Aim of this diploma thesis is to use Variance Gamma process in the option pricing model and compare ...
We introduce a pricing model for equity options in which sample paths follow a variance-gamma (VG) j...
The purpose of this article is to introduce a new L\'evy process, termed Variance Gamma++ process, t...
The methodology of pricing financial derivatives, particularly stock options, was first introduced b...
In this paper, we test the three-parameter symmetric variance gamma (SVG) option pricing model and t...
We use a multivariate variance gamma process developed by Jun Wang (2009) and a similarly constructe...
We apply the variance-gamma (VG) option-pricing model to currency options. The model is a pure infin...
This article reviews a pricing model, suitable for variance-gamma jump processes, based on the metho...
Derivative pricing, and in particular the pricing of options, is an important area of current resear...
We derive a form of the partial integro-differential equation (PIDE) for pricing American options un...
We reformulate the Lévy-Kintchine formula to make it suitable for modelling the stochastic time-chan...
This paper studies the equity premium and option pricing under the general equilibrium framework tak...