Add to ORKGWe consider the hedging of European options when the price of the underlying asset follows a single-factor Markovian framework. By working in such a setting, Carr and Wu \cite{carr2014static} derived a spanning relation between a given option and a continuum of shorter-term options written on the same asset. In this paper, we have extended their approach to simultaneously include options over multiple short maturities. We then show a practical implementation of this with a finite set of shorter-term options to determine the hedging error using a Gaussian Quadrature method. We perform a wide range of experiments for both the \textit{Black-Scholes} and \textit{Merton Jump Diffusion} models, illustrating the comparative performance of the two ...
Conventional wisdom holds that since continuous-time, Black-Scholes hedging is infinitely expensive ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
In the first chapter,which is a joint work with Mathieu Cambou and Philippe H.A. Charmoy, we study t...
We consider the hedging of derivative securities when the price movement of the underlying asset can...
Working in a single-factor Markovian setting, this paper derives a new, static spanning rela-tion be...
Abstract: This paper applies to the static hedge of barrier options a technique, mean-square hedging...
This paper proposes a new scheme for static hedging of European path-independent derivatives under s...
AbstractThis paper presents a new methodology for hedging long-term financial derivatives written on...
We propose an approximate static hedging procedure for multivariate derivatives. The hedging portfol...
International audienceAn elementary arbitrage principle and the existence of trends in financial tim...
In this paper the performance of a static hedging strategy of European barrier options are evaluated...
We explore how to put the theory on static hedges of barrier options into use. We discuss a polynomi...
In this paper the performance of a static hedging strategy of European barrier options are evaluated...
Quadratic hedging is a well developed theory for hedging contingent claims in incomplete markets by ...
International audienceThis paper introduces variants of strangles, called Euro-American or hybrid st...
Conventional wisdom holds that since continuous-time, Black-Scholes hedging is infinitely expensive ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
In the first chapter,which is a joint work with Mathieu Cambou and Philippe H.A. Charmoy, we study t...
We consider the hedging of derivative securities when the price movement of the underlying asset can...
Working in a single-factor Markovian setting, this paper derives a new, static spanning rela-tion be...
Abstract: This paper applies to the static hedge of barrier options a technique, mean-square hedging...
This paper proposes a new scheme for static hedging of European path-independent derivatives under s...
AbstractThis paper presents a new methodology for hedging long-term financial derivatives written on...
We propose an approximate static hedging procedure for multivariate derivatives. The hedging portfol...
International audienceAn elementary arbitrage principle and the existence of trends in financial tim...
In this paper the performance of a static hedging strategy of European barrier options are evaluated...
We explore how to put the theory on static hedges of barrier options into use. We discuss a polynomi...
In this paper the performance of a static hedging strategy of European barrier options are evaluated...
Quadratic hedging is a well developed theory for hedging contingent claims in incomplete markets by ...
International audienceThis paper introduces variants of strangles, called Euro-American or hybrid st...
Conventional wisdom holds that since continuous-time, Black-Scholes hedging is infinitely expensive ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
In the first chapter,which is a joint work with Mathieu Cambou and Philippe H.A. Charmoy, we study t...