Using Malliavin weights in a jump-diffusion model we obtain an expression for Theta (the sensitivity of an option price with respect to the time remaining until exercise), with application to European and Asian options with non-smooth payoff function. In time inhomogeneous models our formula applies to the derivative with respect to the maturity date $T$, and its proof can be viewed as a generalization of Dupire's integration by parts to arbitrary payoff functions. In the time homogeneous case, our result applies to the derivative with respect to the current date T, but our representation formula differs from the one obtained from the Black-Scholes PDE in terms of Delta and Gamma. Optimal weights are computed by minimization of variance and...
In this paper, we introduce a unifying approach to option pricing under continuous-time stochastic v...
We present a new approach to price options when the underlying asset follows a jump diffusion proces...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
A well-known application of Malliavin calculus in mathematical finance is the probabilistic represen...
We use the Malliavin calculus for Poisson processes in order to compute sensitivities for European o...
Using the Malliavin calculus on Poisson space we compute Greeks in a market driven by a discontinuou...
International audienceUsing Malliavin calculus techniques, we derive an analytical formula for the p...
We derive a computable approximation for the value of a European call option when prices satisfy a j...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
We provide a new theoretical framework for estimating the price sensitivities of a trading position ...
When underlying financial variables follow a Markov jump-diffusion process, the value function of a ...
AbstractIn recent years efficient methods have been developed for calculating derivative price sensi...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...
We propose a new computational method for the valuation of options in jump-diffusion models. The opt...
We develop an implicit–explicit midpoint formula with variable spatial step-sizes and variable time ...
In this paper, we introduce a unifying approach to option pricing under continuous-time stochastic v...
We present a new approach to price options when the underlying asset follows a jump diffusion proces...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
A well-known application of Malliavin calculus in mathematical finance is the probabilistic represen...
We use the Malliavin calculus for Poisson processes in order to compute sensitivities for European o...
Using the Malliavin calculus on Poisson space we compute Greeks in a market driven by a discontinuou...
International audienceUsing Malliavin calculus techniques, we derive an analytical formula for the p...
We derive a computable approximation for the value of a European call option when prices satisfy a j...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
We provide a new theoretical framework for estimating the price sensitivities of a trading position ...
When underlying financial variables follow a Markov jump-diffusion process, the value function of a ...
AbstractIn recent years efficient methods have been developed for calculating derivative price sensi...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...
We propose a new computational method for the valuation of options in jump-diffusion models. The opt...
We develop an implicit–explicit midpoint formula with variable spatial step-sizes and variable time ...
In this paper, we introduce a unifying approach to option pricing under continuous-time stochastic v...
We present a new approach to price options when the underlying asset follows a jump diffusion proces...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...