Add to ORKGIt is well documented that a model for the underlying asset price process that seeks to capture the behaviour of the market prices of vanilla options needs to exhibit both diffusion and jump features. In this paper we assume that the asset price process $S$ is Markov with cadlag paths and propose a scheme for computing the law of the realized variance of the log returns accrued while the asset was trading in a prespecified corridor. We thus obtain an algorithm for pricing and hedging volatility derivatives and derivatives on the corridor-realized variance in such a market. The class of models under consideration is large, as it encompasses jump-diffusion and Levy processes. We prove the weak convergence of the scheme and describe in detail ...
none3noIn this paper we discuss the tractability of stochastic volatility models for pricing and hed...
Volatility derivatives are a class of derivative products whose payoffs are closely associated with ...
It is widely accepted the use of the standard Brownian motion to model risky financial object, like ...
It is well documented that a model for the underlying asset price process that seeks to capture the ...
In this paper, we introduce a class of quite general Lévy processes, with both a diffusion part and ...
A numerical method for pricing financial derivatives based on continuous-time Markov chains is propo...
We introduce a pricing model for equity options in which sample paths follow a variance-gamma (VG) j...
We consider the pricing of a range of volatility derivatives, including volatility and variance swap...
A traditional model for financial asset prices is that of a solution of a stochastic differential eq...
A stochastic volatility jump-diffusion model for pricing derivatives with jumps in both spot return ...
We introduce a discrete-time model for log-return dynamics with observable volatility and jumps. Our...
We consider the pricing of options when the dynamics of the risky underlying asset are driven by a M...
In this paper, we consider a market model where the risky asset is a jump diffusion whose drift, vol...
To improve the empirical performance of the Black-Scholes model, many alternative models have been p...
Implied volatility indices are becoming increasingly popular as a measure of market uncertainty and ...
none3noIn this paper we discuss the tractability of stochastic volatility models for pricing and hed...
Volatility derivatives are a class of derivative products whose payoffs are closely associated with ...
It is widely accepted the use of the standard Brownian motion to model risky financial object, like ...
It is well documented that a model for the underlying asset price process that seeks to capture the ...
In this paper, we introduce a class of quite general Lévy processes, with both a diffusion part and ...
A numerical method for pricing financial derivatives based on continuous-time Markov chains is propo...
We introduce a pricing model for equity options in which sample paths follow a variance-gamma (VG) j...
We consider the pricing of a range of volatility derivatives, including volatility and variance swap...
A traditional model for financial asset prices is that of a solution of a stochastic differential eq...
A stochastic volatility jump-diffusion model for pricing derivatives with jumps in both spot return ...
We introduce a discrete-time model for log-return dynamics with observable volatility and jumps. Our...
We consider the pricing of options when the dynamics of the risky underlying asset are driven by a M...
In this paper, we consider a market model where the risky asset is a jump diffusion whose drift, vol...
To improve the empirical performance of the Black-Scholes model, many alternative models have been p...
Implied volatility indices are becoming increasingly popular as a measure of market uncertainty and ...
none3noIn this paper we discuss the tractability of stochastic volatility models for pricing and hed...
Volatility derivatives are a class of derivative products whose payoffs are closely associated with ...
It is widely accepted the use of the standard Brownian motion to model risky financial object, like ...