We consider an asset whose risk-neutral dynamics are described by a general class of local-stochastic volatility models and derive a family of asymptotic expansions for European-style option prices and implied volatilities. We also establish rigorous error estimates for these quantities. Our implied volatility expansions are explicit; they do not require any special functions nor do they require numerical integration. To illustrate the accuracy and versatility of our method, we implement it under four different model dynamics: constant elasticity of variance local volatility, Heston stochastic volatility, three-halves stochastic volatility, and SABR local-stochastic volatility
We consider a market model of financial engineering with three factors represented by three correlat...
In this thesis, we derive a closed-form approximation to the implied volatility for a European optio...
Due to recent research disproving old claims in financial mathematics such as constant volatility in ...
We consider an asset whose risk-neutral dynamics are described by a general class of local-stochasti...
In this paper we propose analytical approximations for computing implied volatilities when time-to-m...
International audienceFor general time-dependent local volatility models, we propose new approximati...
We consider a modelling setup where the VIX index dynamics are explicitly computable as a smooth tra...
The growth of the exchange-traded fund (ETF) industry has given rise to the trading of options writt...
This paper consists in providing and mathematically analyzing the expansion of an option price (with...
In this work we address the problem of finding formulas for efficient and reliable analytical approx...
For any strictly positive martingale S with an analytically tractable characteristic function, we pr...
Using classical Taylor series techniques, we develop a unified approach to pricing and implied volat...
Local volatility models are commonly used for pricing and hedging exotic options consistently with a...
We introduce an asymptotic expansion for forward start options in a multi-factor local-stochastic vo...
In this paper we develop a general method for deriving closed-form approximations of European option...
We consider a market model of financial engineering with three factors represented by three correlat...
In this thesis, we derive a closed-form approximation to the implied volatility for a European optio...
Due to recent research disproving old claims in financial mathematics such as constant volatility in ...
We consider an asset whose risk-neutral dynamics are described by a general class of local-stochasti...
In this paper we propose analytical approximations for computing implied volatilities when time-to-m...
International audienceFor general time-dependent local volatility models, we propose new approximati...
We consider a modelling setup where the VIX index dynamics are explicitly computable as a smooth tra...
The growth of the exchange-traded fund (ETF) industry has given rise to the trading of options writt...
This paper consists in providing and mathematically analyzing the expansion of an option price (with...
In this work we address the problem of finding formulas for efficient and reliable analytical approx...
For any strictly positive martingale S with an analytically tractable characteristic function, we pr...
Using classical Taylor series techniques, we develop a unified approach to pricing and implied volat...
Local volatility models are commonly used for pricing and hedging exotic options consistently with a...
We introduce an asymptotic expansion for forward start options in a multi-factor local-stochastic vo...
In this paper we develop a general method for deriving closed-form approximations of European option...
We consider a market model of financial engineering with three factors represented by three correlat...
In this thesis, we derive a closed-form approximation to the implied volatility for a European optio...
Due to recent research disproving old claims in financial mathematics such as constant volatility in ...