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Title: Valuation of two-factor options under the Merton jump-diffusion model using orthogonal spline wavelets (English)
Author: Černá, Dana
Language: English
Journal: Programs and Algorithms of Numerical Mathematics
Volume: Proceedings of Seminar. Jablonec nad Nisou, June 19-24, 2022
Issue: 2022
Year:
Pages: 47-56
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Category: math
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Summary: This paper addresses the two-asset Merton model for option pricing represented by non-stationary integro-differential equations with two state variables. The drawback of most classical methods for solving these types of equations is that the matrices arising from discretization are full and ill-conditioned. In this paper, we first transform the equation using logarithmic prices, drift removal, and localization. Then, we apply the Galerkin method with a recently proposed orthogonal cubic spline-wavelet basis combined with the Crank-Nicolson scheme. We show that the proposed method has many benefits. First, as is well-known, the wavelet-Galerkin method leads to sparse matrices, which can be solved efficiently using iterative methods. Furthermore, since the basis functions are cubic splines, the method is higher-order convergent. Due to the orthogonality of the basis functions, the matrices are well-conditioned even without preconditioning, computation is simplified, and the required number of iterations is less than for non-orthogonal cubic spline-wavelet bases. Numerical experiments are presented for European-style options on the maximum of two assets. (English)
Keyword: wavelet-Galerkin method
Keyword: Crank-Nicolson scheme
Keyword: orthogonal spline wavelets
MSC: 47G20
MSC: 60G51
MSC: 65M60
MSC: 65T60
DOI: 10.21136/panm.2022.05
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Date available: 2023-04-13T06:22:20Z
Last updated: 2023-06-05
Stable URL: http://hdl.handle.net/10338.dmlcz/703187
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