Add to ORKGWe study the robustness of option prices to model variation within a jump-diffusion framework. In particular we consider models in which the small variations in price dynamics are modeled with a Poisson random measure with infinite activity and models in which these small variations are modeled with a Brownian motion. We show that option prices are robust. Moreover we study the computation of the deltas in this framework with two approaches, the Malliavin method and the Fourier method. We show robustness of the deltas to the model variatio
In this paper, we consider the problem of pricing a spread option when the underlying assets follow ...
In this paper we consider the problem of pricing a Spread Option when the underlying assets follow ...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
The shortcomings of diffusion models in representing the risk related to large market movements have...
We study the option pricing problem in jump diffusion models from both probabilistic and PDE perspec...
We study the robustness of the sensitivity with respect to parameters in expectation functionals wit...
We study the pricing of spread options. We consider a bivariate jump-diffusion model for the price p...
This thesis covers miscellaneous topics in financial and insurance mathematics. The first two chapte...
A well-known application of Malliavin calculus in mathematical finance is the probabilistic represen...
In this paper we examine the dependence of option prices in a general jump-diffusion model on the ch...
A traditional model for financial asset prices is that of a solution of a stochastic differential eq...
Abstract. We study convexity and monotonicity properties of option prices in a jump-diffusion model ...
We study convexity and monotonicity properties of option prices in a jump-diffusion model using the ...
A model for a set of stock prices is said to be convexity preserving if the price of any convex Euro...
We provide a new theoretical framework for estimating the price sensitivities of a trading position ...
In this paper, we consider the problem of pricing a spread option when the underlying assets follow ...
In this paper we consider the problem of pricing a Spread Option when the underlying assets follow ...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
The shortcomings of diffusion models in representing the risk related to large market movements have...
We study the option pricing problem in jump diffusion models from both probabilistic and PDE perspec...
We study the robustness of the sensitivity with respect to parameters in expectation functionals wit...
We study the pricing of spread options. We consider a bivariate jump-diffusion model for the price p...
This thesis covers miscellaneous topics in financial and insurance mathematics. The first two chapte...
A well-known application of Malliavin calculus in mathematical finance is the probabilistic represen...
In this paper we examine the dependence of option prices in a general jump-diffusion model on the ch...
A traditional model for financial asset prices is that of a solution of a stochastic differential eq...
Abstract. We study convexity and monotonicity properties of option prices in a jump-diffusion model ...
We study convexity and monotonicity properties of option prices in a jump-diffusion model using the ...
A model for a set of stock prices is said to be convexity preserving if the price of any convex Euro...
We provide a new theoretical framework for estimating the price sensitivities of a trading position ...
In this paper, we consider the problem of pricing a spread option when the underlying assets follow ...
In this paper we consider the problem of pricing a Spread Option when the underlying assets follow ...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...