2006
DOI: 10.21314/jcf.2006.144
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Partially exact and bounded approximations for arithmetic Asian options

Abstract: This paper considers the pricing of European Asian options in the Black-Scholes framework. All approaches we consider are readily extendable to the case of an Asian basket option. We consider three methods for evaluating the price of an Asian option, and contribute to all three. Firstly, we show the link between the approaches of Rogers and Shi [1995], Andreasen [1999], Hoogland and Neumann [2000] and Večeř [2001]. For the latter formulation we propose two reductions, which increase the numerical stability an… Show more

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Cited by 48 publications
(22 citation statements)
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“…Then, S will not be a comonotonic sum of random variables, making the determination of the lower bound more complicated since it does not follow from the comonotonicity literature. To determine a lower bound, we follow the approach suggested in [15] for basket options. We know that the lower bound can be rewritten as…”
Section: Non-comonotonic Lower Bound and Upper Bound Based On The Rogmentioning
confidence: 99%
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“…Then, S will not be a comonotonic sum of random variables, making the determination of the lower bound more complicated since it does not follow from the comonotonicity literature. To determine a lower bound, we follow the approach suggested in [15] for basket options. We know that the lower bound can be rewritten as…”
Section: Non-comonotonic Lower Bound and Upper Bound Based On The Rogmentioning
confidence: 99%
“…Thompson [19] used a first order approximation to the arithmetic sum and derived an upper bound that sharpens those of Rogers and Shi. Lord [15] revised Thompson's method and proposed a shift lognormal approximation to the sums and he included a supplementary parameter which is estimated by an optimization algorithm. In [16], Nielsen and Sandmann applied the Rogers and Shi approach to arithmetic Asian option pricing by using one specific standardized normally distributed conditioning variable and only in a Black and Scholes setting.…”
Section: Introductionmentioning
confidence: 99%
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