A binomial lattice approach is proposed for valuing options whose payoff depends on multiple state variables following correlated geometric Brownian processes. The proposed approach relies on two simple ideas: a log-transformation of the underlying processes, which is step by step consistent with the continuous-time diffusions, and a change of basis of the asset span, to transform asset prices into uncorrelated processes. An additional transformation is applied to approximate driftless dynamics. Even if these features are simple and straightforward to implement, it is shown that they significantly improve the efficiency of the multi-dimensional binomial algorithm. A thorough test of efficiency is provided compared with most popular binomial...
In the theory of option pricing one is usually concerned with evaluating expectations under the risk...
AbstractAdaptive lattice methods are developed to compute the price of multivariate contingent claim...
The Cox, Ross, and Rubinstein binomial model is generalized to the multinomial case. Limits are inve...
We propose a binomial lattice approach for valuing options whose payoff depends on multiple state va...
We propose a binomial lattice approach for valuing options whose payoff depends on multiple state va...
This thesis deals with the application of binomial option pricing in a single-asset Black-Scholes ma...
This article revisits the topic of two-state pricing of currency options. It examines the mode...
This thesis studies binomial and trinomial lattice approximations in Black-Scholes type option prici...
This thesis studies binomial and trinomial lattice approximations in Black-Scholes type option prici...
This thesis compares three methods for numerically pricing multi-asset options, as- suming the under...
Since the binomial lattice was introduced by Cox, Ross, and Rubinstein to value options on a single ...
In this paper, we present a methodology for approximating a correlated multivariate-lognormal proces...
AbstractIn this paper we propose a Symmetrical Binomial Lattice Approach that is equivalent to the w...
Lattice methods or tree methods play an important role in option pricing. They are robust, and relat...
In this research the recombining binomial lattice approach for valuing real options is generalized ...
In the theory of option pricing one is usually concerned with evaluating expectations under the risk...
AbstractAdaptive lattice methods are developed to compute the price of multivariate contingent claim...
The Cox, Ross, and Rubinstein binomial model is generalized to the multinomial case. Limits are inve...
We propose a binomial lattice approach for valuing options whose payoff depends on multiple state va...
We propose a binomial lattice approach for valuing options whose payoff depends on multiple state va...
This thesis deals with the application of binomial option pricing in a single-asset Black-Scholes ma...
This article revisits the topic of two-state pricing of currency options. It examines the mode...
This thesis studies binomial and trinomial lattice approximations in Black-Scholes type option prici...
This thesis studies binomial and trinomial lattice approximations in Black-Scholes type option prici...
This thesis compares three methods for numerically pricing multi-asset options, as- suming the under...
Since the binomial lattice was introduced by Cox, Ross, and Rubinstein to value options on a single ...
In this paper, we present a methodology for approximating a correlated multivariate-lognormal proces...
AbstractIn this paper we propose a Symmetrical Binomial Lattice Approach that is equivalent to the w...
Lattice methods or tree methods play an important role in option pricing. They are robust, and relat...
In this research the recombining binomial lattice approach for valuing real options is generalized ...
In the theory of option pricing one is usually concerned with evaluating expectations under the risk...
AbstractAdaptive lattice methods are developed to compute the price of multivariate contingent claim...
The Cox, Ross, and Rubinstein binomial model is generalized to the multinomial case. Limits are inve...