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Semi-analytical pricing of American options with hybrid dividends via integral equations and the GIT method

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  • Andrey Itkin

Abstract

This paper introduces a semi-analytical method for pricing American options on assets (stocks, ETFs) that pay discrete and/or continuous dividends. The problem is notoriously complex because discrete dividends create abrupt price drops and affect the optimal exercise timing, making traditional continuous-dividend models unsuitable. Our approach utilizes the Generalized Integral Transform (GIT) method introduced by the author and his co-authors in a number of papers, which transforms the pricing problem from a complex partial differential equation with a free boundary into an integral Volterra equation of the second or first kind. In this paper we illustrate this approach by considering a popular GBM model that accounts for discrete cash and proportional dividends using Dirac delta functions. By reframing the problem as an integral equation, we can sequentially solve for the option price and the early exercise boundary, effectively handling the discontinuities caused by the dividends. Our methodology provides a powerful alternative to standard numerical techniques like binomial trees or finite difference methods, which can struggle with the jump conditions of discrete dividends by losing accuracy or performance. Several examples demonstrate that the GIT method is highly accurate and computationally efficient, bypassing the need for extensive computational grids or complex backward induction steps.

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  • Andrey Itkin, 2025. "Semi-analytical pricing of American options with hybrid dividends via integral equations and the GIT method," Papers 2510.18159, arXiv.org.
    • Handle: RePEc:arx:papers:2510.18159
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    References listed on IDEAS

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    1. Andrey Itkin & Yerkin Kitapbayev, 2025. "Floating exercise boundaries for American options in time-inhomogeneous models," Papers 2502.00740, arXiv.org, revised Jul 2025.
    2. Jia-Hau Guo & Lung-Fu Chang, 2020. "A generalization of option pricing to price-limit markets," Review of Derivatives Research, Springer, vol. 23(2), pages 145-161, July.
    3. J. D. Evans & R. Kuske & Joseph B. Keller, 2002. "American options on assets with dividends near expiry," Mathematical Finance, Wiley Blackwell, vol. 12(3), pages 219-237, July.
    4. H. Berestycki & J. Busca & I. Florent, 2002. "Asymptotics and calibration of local volatility models," Quantitative Finance, Taylor & Francis Journals, vol. 2(1), pages 61-69.
    5. Roll, Richard, 1977. "An analytic valuation formula for unprotected American call options on stocks with known dividends," Journal of Financial Economics, Elsevier, vol. 5(2), pages 251-258, November.
    6. Geske, Robert, 1979. "A note on an analytical valuation formula for unprotected American call options on stocks with known dividends," Journal of Financial Economics, Elsevier, vol. 7(4), pages 375-380, December.
    7. Song-Ping Zhu & Xin-Jiang He & XiaoPing Lu, 2018. "A new integral equation formulation for American put options," Quantitative Finance, Taylor & Francis Journals, vol. 18(3), pages 483-490, March.
    8. Whaley, Robert E., 1981. "On the valuation of American call options on stocks with known dividends," Journal of Financial Economics, Elsevier, vol. 9(2), pages 207-211, June.
    9. Yue-Kuen Kwok, 2008. "Mathematical Models of Financial Derivatives," Springer Finance, Springer, edition 2, number 978-3-540-68688-0, October.
    10. Ivan Matić & Radoš Radoičić & Dan Stefanica, 2020. "A PDE method for estimation of implied volatility," Quantitative Finance, Taylor & Francis Journals, vol. 20(3), pages 393-408, March.
    11. O. Burkovska & M. Gass & K. Glau & M. Mahlstedt & W. Schoutens & B. Wohlmuth, 2018. "Calibration to American options: numerical investigation of the de-Americanization method," Quantitative Finance, Taylor & Francis Journals, vol. 18(7), pages 1091-1113, July.
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