In this paper we consider the problem of calculating the quantiles of a risky position, the dynamic of which is described as a continuous time regime-switching jump-diffusion, by using Fourier Transform methods. Furthermore, we study a classical option-based portfolio strategy which minimizes the Value-at-Risk of the hedged position and show the impact of jumps and switching regimes on the optimal strategy in a numerical example. However, the analysis of this hedging strategy, as well as the computational technique for its implementation, is fairly general, i.e. it can be applied to any dynamical model for which Fourier transform methods are viable
In the last decade, fast Fourier transform methods (i.e. FFT) have become the standard tool for pric...
In this paper, we consider a market model where the risky asset is a jump diffusion whose drift, vol...
In this paper we investigate the consequences of the choice of the model to partial hedging in incom...
In this paper we consider the problem of calculating the quantiles of a risky position, the dynamic ...
In this paper we study a classical option-based portfolio strategy which minimizes the Value-at-Risk...
In this paper we consider a jump-diffusion dynamic whose parameters are driven by a continuous time...
In this thesis we discuss option pricing and hedging under regime switching models. To the standard...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
Although jump-diffusion and Lévy models have been widely used in industry, the resulting pricing par...
This paper proposes a Laplace-transform-based approach to price the fixed-strike quantile options as...
In this paper, we consider the problem of pricing a spread option when the underlying assets follow ...
This paper is concerned with option valuation under a double regime-switching model, where both the ...
In this paper we consider the problem of pricing a Spread Option when the underlying assets follow ...
A new jump diffusion regime-switching model is introduced, which allows for linking jumps in asset p...
In this paper, we introduce a new Fourier method for computing value-at-risk for a portfolio with de...
In the last decade, fast Fourier transform methods (i.e. FFT) have become the standard tool for pric...
In this paper, we consider a market model where the risky asset is a jump diffusion whose drift, vol...
In this paper we investigate the consequences of the choice of the model to partial hedging in incom...
In this paper we consider the problem of calculating the quantiles of a risky position, the dynamic ...
In this paper we study a classical option-based portfolio strategy which minimizes the Value-at-Risk...
In this paper we consider a jump-diffusion dynamic whose parameters are driven by a continuous time...
In this thesis we discuss option pricing and hedging under regime switching models. To the standard...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
Although jump-diffusion and Lévy models have been widely used in industry, the resulting pricing par...
This paper proposes a Laplace-transform-based approach to price the fixed-strike quantile options as...
In this paper, we consider the problem of pricing a spread option when the underlying assets follow ...
This paper is concerned with option valuation under a double regime-switching model, where both the ...
In this paper we consider the problem of pricing a Spread Option when the underlying assets follow ...
A new jump diffusion regime-switching model is introduced, which allows for linking jumps in asset p...
In this paper, we introduce a new Fourier method for computing value-at-risk for a portfolio with de...
In the last decade, fast Fourier transform methods (i.e. FFT) have become the standard tool for pric...
In this paper, we consider a market model where the risky asset is a jump diffusion whose drift, vol...
In this paper we investigate the consequences of the choice of the model to partial hedging in incom...