Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions

Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions

University of Macau === Faculty of Science and Technology === Department of Mathematics

Bibliographic Details
Main Author: Liu, Xin
Language:English
Published: University of Macau 2010
Subjects:
University of Macau > Dissertations
澳門大學 > 論文
Options (Finance) > Mathematical models
Options (Finance) > Prices > Mathematical models
Pricing > Mathematical models
Mathematics > Department of Mathematics
Online Access:http://umaclib3.umac.mo/record=b2148264
id ndltd-MACAU-oai-libdigital.umac.mo-b2148264
record_format oai_dc
spelling ndltd-MACAU-oai-libdigital.umac.mo-b21482642013-01-07T23:06:49Z2010http://umaclib3.umac.mo/record=b2148264UM_THESESUniversity of MacauFaculty of Science and TechnologyDepartment of MathematicsUniversity of MacauUniversity of Macau -- Dissertations澳門大學 -- 論文Options (Finance) -- Mathematical modelsOptions (Finance) -- Prices -- Mathematical modelsPricing -- Mathematical modelsMathematics -- Department of MathematicsengLiu, XinFast exponential time integration scheme and extrapolation method for pricing option with jump diffusionsIn 1973, Black and Scholes [3] proposed their famous formula for pricing options under the pure-diffusion model. Later Merton [21] proposed to add lognormally distributed jumps, while Kou [18] suggested a model with double exponentially distributed jumps to improve Black and Scholes’ model. In most cases, these models are treated with numerical methods. One of the numerical methods for finding option prices is related to solving a partial integro-differential equation (PIDE). For discretization of this PIDE, most existing methods employ straightforward second-order schemes for spatial direction and time-stepping schemes for time direction. Feng and Linetsky proposed to use the extrapolation approach in combination with implicitexplicit Euler (IMEX-Euler) scheme [9]. Lately, Tangman et al. [27] proposed to use an exponential time integration (ETI) scheme for handling the time direction when solving a PIDE. In Chapter 1, we mainly discuss the history of option pricing problems and numerical methods for pricing options. Among them, we mainly focus on Feng and Linetsky’s IMEX extrapolation scheme and Tangman et al.’s ETI scheme. In [19], Lee et al. proporsed a fast approach for computing the Toeplitz matrix [An]j;k = aj−k multiplied by a vector. In Chapter 2, we employs the Toeplitz matrix exponential (TME) method for pricing options. The main idea is using the shift-and-invert Arnoldi method to omit the direct computation of the matrix exponential. In this thesis, we use that method for the option pricing problem. However, the convergence analysis in [19] is not directly applicable in our case. Therefore, we propose another criterion to judge the capability of the shift-and-invert Arnoldi approximation, and prove that such criterion is satisfied in the option pricing problem. Numerical results are given to demonstrate the efficiency of our proposed scheme, with comparison to other numerical methods for the option pricing problem.
collection NDLTD
language English
sources NDLTD
topic University of Macau -- Dissertations
澳門大學 -- 論文
Options (Finance) -- Mathematical models
Options (Finance) -- Prices -- Mathematical models
Pricing -- Mathematical models
Mathematics -- Department of Mathematics
spellingShingle University of Macau -- Dissertations
澳門大學 -- 論文
Options (Finance) -- Mathematical models
Options (Finance) -- Prices -- Mathematical models
Pricing -- Mathematical models
Mathematics -- Department of Mathematics
Liu, Xin
Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
description University of Macau === Faculty of Science and Technology === Department of Mathematics
author Liu, Xin
author_facet Liu, Xin
author_sort Liu, Xin
title Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
title_short Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
title_full Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
title_fullStr Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
title_full_unstemmed Fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
title_sort fast exponential time integration scheme and extrapolation method for pricing option with jump diffusions
publisher University of Macau
publishDate 2010
url http://umaclib3.umac.mo/record=b2148264
work_keys_str_mv AT liuxin fastexponentialtimeintegrationschemeandextrapolationmethodforpricingoptionwithjumpdiffusions
_version_ 1716478995250282496

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