Artikel ; Online: IMEX Runge-Kutta method for solving jump-diffusion option pricing equation
Journal of Shanghai Normal University (Natural Sciences), Vol 51, Iss 3, Pp 277-
2022 Band 283
Abstract: The study on financial derivatives pricing has been one of the difficult issues in financial mathematics. With the continuous development and improvement of option pricing theory, the research on the jump-diffusion option pricing model has become a ... ...
Abstract | The study on financial derivatives pricing has been one of the difficult issues in financial mathematics. With the continuous development and improvement of option pricing theory, the research on the jump-diffusion option pricing model has become a hotspot, which is a partial integro-differential equation over an unbounded region. Study the extrapolated variable step-sizes implicit-explicit (IMEX) Runge-Kutta methods combined with finite-difference space discretization for European option pricing problems under the jump-diffusion model, and the effectiveness of the methods is verified by numerical experiments. |
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Schlagwörter | option pricing ; partial integro-differential equations ; extrapolated ; variable step-sizes implicit-explicit (imex) runge- kutta methods ; finite difference method ; Science (General) ; Q1-390 |
Sprache | Englisch |
Erscheinungsdatum | 2022-06-01T00:00:00Z |
Verlag | Academic Journals Center of Shanghai Normal University |
Dokumenttyp | Artikel ; Online |
Datenquelle | BASE - Bielefeld Academic Search Engine (Lebenswissenschaftliche Auswahl) |
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