This paper deals with the computation of second or higher order greeks of financial securities. It combines two methods, Vibrato and automatic differentiation and compares with other methods. We show that this combined technique is faster than standard finite difference, more stable than automatic differentiation of second order derivatives and more general than Malliavin Calculus. We present a generic framework to compute any greeks and present several applications on different types of financial contracts: European and American options, multidimensional Basket Call and stochastic volatility models such as Heston's model. We give also an algorithm to compute derivatives for the Longstaff-Schwartz Monte Carlo method for American options. We...
We developed a new scheme for computing ?Greeks?of derivatives by an asymptotic expansion approach. ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
We show how algorithmic differentiation can be used to efficiently implement the pathwise derivative...
International audienceThis paper deals with the computation of second or higher order greeks of fina...
In this thesis, we will focus on the critical node of the computation of counterparty credit risk, t...
Monte Carlo simulation is a popular method in computational finance. Its basic theory is relatively ...
Monte Carlo simulation is a popular method in computational finance. Its basic theory is relatively ...
In computational ¯nance Monte Carlo simulation can be used to calculate the correct prices of ¯nanci...
Dans cette thèse, nous nous intéressons à des noeuds critiques du calcul du risque de contrepartie, ...
No front-office software can survive without providing derivatives of options prices with respect to...
Automatic differentiation is involved for long in applied mathematics as an alternative to finite di...
In computational finance, Monte Carlo simulation is used to compute the correct prices for financial...
Monte Carlo simulation methods have become more and more important in the financial sector in the pa...
In computational finance, Monte Carlo simulation is used to compute the correct prices for financial...
The Greeks in finance are the partial derivatives of a financial quantity with respect to any of the...
We developed a new scheme for computing ?Greeks?of derivatives by an asymptotic expansion approach. ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
We show how algorithmic differentiation can be used to efficiently implement the pathwise derivative...
International audienceThis paper deals with the computation of second or higher order greeks of fina...
In this thesis, we will focus on the critical node of the computation of counterparty credit risk, t...
Monte Carlo simulation is a popular method in computational finance. Its basic theory is relatively ...
Monte Carlo simulation is a popular method in computational finance. Its basic theory is relatively ...
In computational ¯nance Monte Carlo simulation can be used to calculate the correct prices of ¯nanci...
Dans cette thèse, nous nous intéressons à des noeuds critiques du calcul du risque de contrepartie, ...
No front-office software can survive without providing derivatives of options prices with respect to...
Automatic differentiation is involved for long in applied mathematics as an alternative to finite di...
In computational finance, Monte Carlo simulation is used to compute the correct prices for financial...
Monte Carlo simulation methods have become more and more important in the financial sector in the pa...
In computational finance, Monte Carlo simulation is used to compute the correct prices for financial...
The Greeks in finance are the partial derivatives of a financial quantity with respect to any of the...
We developed a new scheme for computing ?Greeks?of derivatives by an asymptotic expansion approach. ...
In this thesis, we propose three new computational methods to price financial derivatives and constr...
We show how algorithmic differentiation can be used to efficiently implement the pathwise derivative...