This paper studies the relative error in the crude Monte Carlo pricing of some familiar European path-dependent multiasset options. For the crude Monte Carlo method it is well known that the convergence rate O(n-1/2), where n is the number of simulations, is independent of the dimension of the integral. This paper also shows that for a large class of pricing problems in the multiasset Black-Scholes market the constant in O(n-1/2) is independent of the dimension. To be more specific, the constant is only dependent on the highest volatility among the underlying assets, time to maturity, and degree of confidence interval
Treball de l'assignatura: "Markets and Derivatives", de tercer o quart curs dels estudis de grau en ...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Parallel stratagems are used as hedging strategies by investors to minimise their exposure to risk...
This paper studies the relative error in the crude Monte Carlo pricing of some familiar European pat...
This paper studies the relative error in the crude Monte Carlo pricing of some familiar European pat...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
Monte Carlo methods are widely-used simulation tools for market practitioners from trading to risk m...
Monte Carlo simulation is a valuable tool in computational finance. It is widely used to evaluate po...
In this paper we discuss accuracy issues of the Monte-Carlo method for valuing American options. Two...
This thesis evaluates different models accuracy of option pricing by MonteCarlo simulations when cha...
Abstract: Monte Carlo methods are widely-used simulation tools for market practitioners from trading...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
This paper attempts to study and explore the most commonly used option pricing models. As we will se...
As increasingly large volumes of sophisticated options (called derivative securities) are traded in ...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
Treball de l'assignatura: "Markets and Derivatives", de tercer o quart curs dels estudis de grau en ...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Parallel stratagems are used as hedging strategies by investors to minimise their exposure to risk...
This paper studies the relative error in the crude Monte Carlo pricing of some familiar European pat...
This paper studies the relative error in the crude Monte Carlo pricing of some familiar European pat...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
Monte Carlo methods are widely-used simulation tools for market practitioners from trading to risk m...
Monte Carlo simulation is a valuable tool in computational finance. It is widely used to evaluate po...
In this paper we discuss accuracy issues of the Monte-Carlo method for valuing American options. Two...
This thesis evaluates different models accuracy of option pricing by MonteCarlo simulations when cha...
Abstract: Monte Carlo methods are widely-used simulation tools for market practitioners from trading...
A standard problem in mathematical finance is the calculation of the price of some financial derivativ...
This paper attempts to study and explore the most commonly used option pricing models. As we will se...
As increasingly large volumes of sophisticated options (called derivative securities) are traded in ...
Monte Carlo path simulations are common in mathematical and computational finance as a way of estima...
Treball de l'assignatura: "Markets and Derivatives", de tercer o quart curs dels estudis de grau en ...
Today, better numerical approximations are required for multi-dimensional SDEs to improve on the poo...
Parallel stratagems are used as hedging strategies by investors to minimise their exposure to risk...