In this paper, we consider a large class of continuous semi-martingale models and propose a generic framework for their simultaneous calibration to vanilla and no-touch options. The method builds on the forward partial integro-differential equation (PIDE) derived by B. Hambly, M. Mariapragassam and C. Reisinger in their 2016 paper, “A forward equation for barrier options under the Brunick & Shreve Markovian projection”; this allows fast computation of up-and-out call prices for the complete set of strikes, barriers and maturities. We also use a novel two-state particle method to estimate the Markovian projection of the variance onto the spot and the running maximum. We detail a step-by-step procedure for a Heston-type local-stochastic volat...
In this paper we consider an explicitly solvable multiscale stochastic volatility model that genera...
The pricing of most contingent claims is continuously monitored the movement of the underlying asset...
We derive a direct link between local and implied volatilities in the form of a quasilinear degenera...
In this thesis, we present a novel approach to the calibration of diffusion models to vanilla and ba...
Abstract. We derive a forward equation for arbitrage-free barrier option prices, in terms of Markovi...
We propose a new framework for modeling stochastic local volatility, with poten-tial applications to...
In this paper we propose the first calibration exercise based on quantization methods. Pricing and c...
An overview of continuous (semi-martingale) optimal transport for model calibration is given in this...
This thesis is about the pricing of equity barrier options under local volatility. We study Dupire's...
International audienceBy Gyongy's theorem, a local and stochastic volatility model is calibrated tot...
In this thesis two novel approaches to pricing of barrier and American options are developed in the ...
A general purpose of mathematical models is to accurately mimic some observed phenomena in the real ...
The two most popular equity derivatives pricing models among practitioners are the local volatility ...
Consistently fitting vanilla option surfaces is an important issue when it comes to modelling in fin...
This thesis is about pricing European options and forward start options under the Heston LSV model. ...
In this paper we consider an explicitly solvable multiscale stochastic volatility model that genera...
The pricing of most contingent claims is continuously monitored the movement of the underlying asset...
We derive a direct link between local and implied volatilities in the form of a quasilinear degenera...
In this thesis, we present a novel approach to the calibration of diffusion models to vanilla and ba...
Abstract. We derive a forward equation for arbitrage-free barrier option prices, in terms of Markovi...
We propose a new framework for modeling stochastic local volatility, with poten-tial applications to...
In this paper we propose the first calibration exercise based on quantization methods. Pricing and c...
An overview of continuous (semi-martingale) optimal transport for model calibration is given in this...
This thesis is about the pricing of equity barrier options under local volatility. We study Dupire's...
International audienceBy Gyongy's theorem, a local and stochastic volatility model is calibrated tot...
In this thesis two novel approaches to pricing of barrier and American options are developed in the ...
A general purpose of mathematical models is to accurately mimic some observed phenomena in the real ...
The two most popular equity derivatives pricing models among practitioners are the local volatility ...
Consistently fitting vanilla option surfaces is an important issue when it comes to modelling in fin...
This thesis is about pricing European options and forward start options under the Heston LSV model. ...
In this paper we consider an explicitly solvable multiscale stochastic volatility model that genera...
The pricing of most contingent claims is continuously monitored the movement of the underlying asset...
We derive a direct link between local and implied volatilities in the form of a quasilinear degenera...