Alghalith, Moawia (2019): A New Price of the Arithmetic Asian Option: A Simple Formula.
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Abstract
We introduce a simple, explicit formula for pricing the arithmetic Asian options. The pricing formula is as simple as the classical Black-Scholes formula.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | A New Price of the Arithmetic Asian Option: A Simple Formula |
| Language: | English |
| Keywords: | Arithmetic Asian option pricing, the arithmetic average of the price, average of log-normal, the Black-Scholes formula. |
| Subjects: | C - Mathematical and Quantitative Methods > C0 - General > C00 - General C - Mathematical and Quantitative Methods > C0 - General > C01 - Econometrics C - Mathematical and Quantitative Methods > C0 - General > C02 - Mathematical Methods C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General G - Financial Economics > G0 - General |
| Item ID: | 117047 |
| Depositing User: | Moawia Alghalith |
| Date Deposited: | 13 Apr 2023 04:22 |
| Last Modified: | 13 Apr 2023 04:22 |
| References: | Aprahamian, H. and B. Maddah (2015). Pricing Asian options via compound gamma and orthogonal polynomials. Applied Mathematics and Computation, 264, 21--43. Asmussen, S., P.O. Goffard, and P. J. Laub (2016). Orthonormal polynomial expansions and lognormal sum densities. arXiv preprint arXiv:1601.01763. Cerny, A. and I. Kyriakou (2011). An improved convolution algorithm for discretely sampled Asian options. Quantitative Finance, 11, 381--389. Corsaro, S., I. Kyriakou, D. Marazzina, and Z. Marino (2019). A general framework for pricing Asian options under stochastic volatility on parallel architectures. European Journal of Operational Research, 272, 1082-1095. Cui, Z., L. Chihoon , and Y. Liu (2018). Single-transform formulas for pricing Asian options in a general approximation framework under Markov processes. European Journal of Operational Research, 266, 1134-1139. Curran, M. (1994). Valuing Asian and portfolio options by conditioning on the geometric mean price. Management Science, 40, 1705--1711. Fu, M. C., D. B. Madan, and T. Wang (1999). Pricing continuous Asian options: a comparison of Monte Carlo and Laplace transform inversion methods. Journal of Computational Finance, 2, 49--74. Fusai, G., D. Marazzina, and M. Marena (2011). Pricing discretely monitored Asian options by maturity randomization. SIAM Journal on Financial Mathematics, 2, 383--403. Gambaro, A.M., I. Kyriakou, and G. Fusai (2020). General lattice methods for arithmetic Asian options. European Journal of Operational Research, 282, 1185-1199. Lapeyre, B., E. and Temam (2001). Competitive Monte Carlo methods for the pricing of Asian options. Journal of Computational Financ, 5, 39--58. Li, W. and S. Chen (2016). Pricing and hedging of arithmetic Asian options via the Edgeworth series expansion approach. The Journal of Finance and Data Science, 2, 1--25. Linetsky, V. (2004). Spectral expansions for Asian (average price) options. Operations Research, 52, 856--867. Willems, S. (2019). Asian option pricing with orthogonal polynomials. Quantitative Finance, 19, 605-618. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/117047 |
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