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Title: Wavelet method for option pricing under the two-asset Merton jump-diffusion model (English)
Author: Černá, Dana
Language: English
Journal: Programs and Algorithms of Numerical Mathematics
Volume: Proceedings of Seminar. Hejnice, June 21-26, 2020
Issue: 2020
Year:
Pages: 30-39
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Category: math
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Summary: This paper examines the pricing of two-asset European options under the Merton model represented by a nonstationary integro-differential equation with two state variables. For its numerical solution, the wavelet-Galerkin method combined with the Crank-Nicolson scheme is used. A drawback of most classical methods is the full structure of discretization matrices. In comparison, the wavelet method enables the approximation of discretization matrices with sparse matrices. Sparsity is essential for the efficient application of iterative methods in solving the resulting systems and the efficient computation of the matrices arising from the discretization of integral terms. To illustrate the efficiency of the method, we provide the results of numerical experiments concerning a European option on the maximum of two assets. (English)
Keyword: Merton model
Keyword: wavelet-Galerkin method
Keyword: integro-differential equation
Keyword: spline wavelets
Keyword: Crank-Nicolson scheme
Keyword: sparse matrix
Keyword: option pricing
MSC: 47G20
MSC: 60G51
MSC: 65M60
MSC: 65T60
DOI: 10.21136/panm.2020.03
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Date available: 2021-05-05T13:38:52Z
Last updated: 2023-06-05
Stable URL: http://hdl.handle.net/10338.dmlcz/703098
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