Open AccessFourier Transform of the Continuous Arithmetic Asian Options PDE
Author(s) -
Zieneb Ali Elshegmani,
Rokiah Rozita Ahmad
Publication year - 2011
Publication title -
isrn applied mathematics
Language(s) - English
Resource type - Journals
eISSN - 2090-5572
pISSN - 2090-5564
DOI - 10.5402/2011/643749
Subject(s) - mathematics , partial differential equation , asian option , degenerate energy levels , fourier transform , arithmetic , mathematical analysis , econometrics , valuation of options , physics , quantum mechanics
Price of the arithmetic Asian options is not known in a closed-form solution, since arithmetic Asian option PDE is a degenerate partial differential equation in three dimensions. In this work we provide a new method for computing the continuous arithmetic Asian option price by means of partial differential equations. Using Fourier transform and changing some variables of the PDE we get a new direct method for solving the governing PDE without reducing the dimensionality of the PDE as most authors have done. We transform the second-order PDE with nonconstant coefficients to the first order with constant coefficients, which can be solved analytically.
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