Abstract
This article investigates the Least-Squares Monte Carlo Method by using different polynomial basis in American Asian Options pricing. The standard approach in the option pricing literature is to choose the basis arbitrarily. By comparing four different polynomial basis we show that the choice of basis interferes in the option's price. We assess Least-Squares Method performance in pricing four different American Asian Options by using four polynomial basis: Power, Laguerre, Legendre and Hermite A. To every American Asian Option priced, three sets of parameters are used in order to evaluate it properly. We show that the choice of the basis interferes in the option's price by showing that one of them converges to the option's value faster than any other by using fewer simulated paths. In the case of an Amerasian call option, for example, we find that the preferable polynomial basis is Hermite A. For an Amerasian put option, the Power polynomial basis is recommended. Such empirical outcome is theoretically unpredictable, since in principle all basis can be indistinctly used when pricing the derivative. In this article The Least-Squares Monte Carlo Method performance is assessed in pricing four different types of American Asian Options by using four different polynomial basis through three different sets of parameters. Our results suggest that one polynomial basis is best suited to perform the method when pricing an American Asian option. Theoretically all basis can be indistinctly used when pricing the derivative. However, our results does not confirm these. We find that when pricing an American Asian put option, Power A is better than the other basis we have studied here whereas when pricing an American Asian call, Hermite A is better.
Highlights
This article investigates the Least-Squares Monte Carlo Method by using different polynomial basis in American Asian Options pricing
The Least-Squares Monte Carlo Method is applied in four different cases of Fixed-Start Time Window3 American Asian options: Case 1 –Arithmetic Average Floating Strike
Whereas when pricing an American Asian call option, Power delivers a better performance in most of cases. These results suggest that pricing American Asian options using the Least-Squares Monte Carlo Method enables the selection of one polynomial basis, regardless of the kind of Amerasian
Summary
This article investigates the Least-Squares Monte Carlo Method by using different polynomial basis in American Asian Options pricing. Its versatility is confirmed by its presence in markets like commodities, electric power, interest rates and currency rates (McDonald 2006) Because they are complex (or exotic), the Asian options are usually traded over the counter. The characteristics of the contract (subject, premium, strike price, deadlines and maturity) are freely agreed between the parties, emphasizing their non-standardization Traditional techniques such as the finite-differences method and lattice become less attractive when dealing with pricing derivatives with multiple stochastic variables, problems with many dimensions, or even path-dependent American options, as it is the case of American Asian (Amerasian) options. The most flexible technique for pricing exotic options, such as American options, is the use of stochastic simulation with optimization algorithm This technique includes different methods, such as the Least-Squares Monte Carlo method (LSM), first introduced by Longstaff and Schwartz (2001). Besides being faster and more precise to compute than other methodologies, the LSM methodology helps assess path-dependent American options with multiple dimensions and multiple state variables, being applied to Markovian and non-Markovian problems
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