This paper proposes a model for asset prices which is the exponential of a pure jump process with an N-state Markov switching compensator. We argue that such a process has a good chance of capturing all the empirical stylized regularities of stock price dynamics and we provide a closed form representation of its characteristic function. We also provide a parsimonious representation of the (not necessarily unique) risk neutral density and showhowto price and hedge a large class of options on assets whose prices follow this process.Robert J. Elliott and Carlton-James U. Osakw
We study a portfolio selection problem in a continuous-time Itô–Markov additive market wi...
The goal of the paper is to show that some types of Levy processes such as the hyperbolic motion and...
We Propose a Model for Valuing Participating Life Insurance Products under a Generalized jump-diffus...
We consider the pricing of options when the dynamics of the risky underlying asset are driven by a M...
This article discusses the pricing of derivatives in a continuous-time, hidden Markov-modulated, pur...
This dissertation contains four autonomous academic papers on asset pricing models with jump process...
In this paper we propose new option pricing models based on class of models with jump contain in the...
AbstractIn this paper we find numerical solutions for the pricing problem in jump diffusion markets....
This article discusses option pricing in a Markov regime-switching model with a random acceleration ...
In this paper, we introduce a class of quite general Lévy processes, with both a diffusion part and ...
In this paper we propose a class of financial market models which are based on telegraph processes w...
A way to model the clustering of jumps in asset prices consists in combining a diffusion process wit...
International audienceIn this paper we propose new option pricing models based on class of models wi...
To improve the empirical performance of the Black-Scholes model, many alternative models have been p...
In this thesis we discuss option pricing and hedging under regime switching models. To the standard...
We study a portfolio selection problem in a continuous-time Itô–Markov additive market wi...
The goal of the paper is to show that some types of Levy processes such as the hyperbolic motion and...
We Propose a Model for Valuing Participating Life Insurance Products under a Generalized jump-diffus...
We consider the pricing of options when the dynamics of the risky underlying asset are driven by a M...
This article discusses the pricing of derivatives in a continuous-time, hidden Markov-modulated, pur...
This dissertation contains four autonomous academic papers on asset pricing models with jump process...
In this paper we propose new option pricing models based on class of models with jump contain in the...
AbstractIn this paper we find numerical solutions for the pricing problem in jump diffusion markets....
This article discusses option pricing in a Markov regime-switching model with a random acceleration ...
In this paper, we introduce a class of quite general Lévy processes, with both a diffusion part and ...
In this paper we propose a class of financial market models which are based on telegraph processes w...
A way to model the clustering of jumps in asset prices consists in combining a diffusion process wit...
International audienceIn this paper we propose new option pricing models based on class of models wi...
To improve the empirical performance of the Black-Scholes model, many alternative models have been p...
In this thesis we discuss option pricing and hedging under regime switching models. To the standard...
We study a portfolio selection problem in a continuous-time Itô–Markov additive market wi...
The goal of the paper is to show that some types of Levy processes such as the hyperbolic motion and...
We Propose a Model for Valuing Participating Life Insurance Products under a Generalized jump-diffus...