A Highly Accurate Finite Element Method to Price Discrete Double Barrier Options

We develop a highly accurate numerical method for pricing discrete double barrier options under the Black–Scholes (BS) model. To this aim, the BS partial differential equation is discretized in space by the parabolic finite element method, which is based on a variational formulation and thus is well...

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Veröffentlicht in:	Computational economics 2014-08, Vol.44 (2), p.153-173
Hauptverfasser:	Golbabai, A., Ballestra, L. V., Ahmadian, D.
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Schlagworte:	Accuracy Approximation Behavioral/Experimental Economics Computational methods Computer Appl. in Social and Behavioral Sciences Convergence Derivatives Economic models Economic theory Economic Theory/Quantitative Economics/Mathematical Methods Economics Economics and Finance Experiments Finite element analysis Investments Math Applications in Computer Science Mathematical functions Monitoring Numerical analysis Operations Research/Decision Theory Partial differential equations Pricing Securities markets Studies
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creator	Golbabai, A. Ballestra, L. V. Ahmadian, D.
description	We develop a highly accurate numerical method for pricing discrete double barrier options under the Black–Scholes (BS) model. To this aim, the BS partial differential equation is discretized in space by the parabolic finite element method, which is based on a variational formulation and thus is well-suited for dealing with the non-smoothness of the discrete barrier option solutions. In addition, the approximation in time is performed using the implicit Euler scheme, which allows us to remove spurious oscillations that may occur at each monitoring date, and whose convergence rate is enhanced by means of a repeated Richardson extrapolation procedure. Numerical experiments are carried out which reveal that the method proposed achieves fourth-order accuracy in both space and time (even if the solutions being approximated are non-smooth), and performs hundredths of times better than a finite difference scheme in Wade et al. (J Comput Appl Math 204:144–158, 2007 ). To the best of our knowledge, the one developed in the present paper is the first lattice-based approach for discrete barrier options which is empirically shown to be fourth-order accurate in both space and time.
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Numerical experiments are carried out which reveal that the method proposed achieves fourth-order accuracy in both space and time (even if the solutions being approximated are non-smooth), and performs hundredths of times better than a finite difference scheme in Wade et al. (J Comput Appl Math 204:144–158, 2007 ). 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V.</creatorcontrib><creatorcontrib>Ahmadian, D.</creatorcontrib><title>A Highly Accurate Finite Element Method to Price Discrete Double Barrier Options</title><title>Computational economics</title><addtitle>Comput Econ</addtitle><description>We develop a highly accurate numerical method for pricing discrete double barrier options under the Black–Scholes (BS) model. To this aim, the BS partial differential equation is discretized in space by the parabolic finite element method, which is based on a variational formulation and thus is well-suited for dealing with the non-smoothness of the discrete barrier option solutions. In addition, the approximation in time is performed using the implicit Euler scheme, which allows us to remove spurious oscillations that may occur at each monitoring date, and whose convergence rate is enhanced by means of a repeated Richardson extrapolation procedure. Numerical experiments are carried out which reveal that the method proposed achieves fourth-order accuracy in both space and time (even if the solutions being approximated are non-smooth), and performs hundredths of times better than a finite difference scheme in Wade et al. (J Comput Appl Math 204:144–158, 2007 ). 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V. ; Ahmadian, D.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c446t-5a740dd1f8a7846e655ba3dd62bc18995d08a19b1e9a8338e4ef150df2830c153</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2014</creationdate><topic>Accuracy</topic><topic>Approximation</topic><topic>Behavioral/Experimental Economics</topic><topic>Computational methods</topic><topic>Computer Appl. in Social and Behavioral Sciences</topic><topic>Convergence</topic><topic>Derivatives</topic><topic>Economic models</topic><topic>Economic theory</topic><topic>Economic Theory/Quantitative Economics/Mathematical Methods</topic><topic>Economics</topic><topic>Economics and Finance</topic><topic>Experiments</topic><topic>Finite element analysis</topic><topic>Investments</topic><topic>Math Applications in Computer Science</topic><topic>Mathematical functions</topic><topic>Monitoring</topic><topic>Numerical analysis</topic><topic>Operations Research/Decision Theory</topic><topic>Partial differential equations</topic><topic>Pricing</topic><topic>Securities markets</topic><topic>Studies</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Golbabai, A.</creatorcontrib><creatorcontrib>Ballestra, L. 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subjects	Accuracy Approximation Behavioral/Experimental Economics Computational methods Computer Appl. in Social and Behavioral Sciences Convergence Derivatives Economic models Economic theory Economic Theory/Quantitative Economics/Mathematical Methods Economics Economics and Finance Experiments Finite element analysis Investments Math Applications in Computer Science Mathematical functions Monitoring Numerical analysis Operations Research/Decision Theory Partial differential equations Pricing Securities markets Studies
title	A Highly Accurate Finite Element Method to Price Discrete Double Barrier Options
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