Homotopy Analysis Wiener-Hermite Expansion (HAM –WHE) Method for Solving Stochastic Differential Equation
Mathematical Sciences Letters • 2016
معلومات البحث
المؤلفون
Aisha A. Fareed, M. A. El-Tawil, Hany N. Hassan
الكلمات المفتاحية
Stochastic nonlinear Diffusion equation; Homotopy analysis method; WHEP technique; Convergence-controller parameter
المجلة العلمية
Mathematical Sciences Letters
الناشر
Not Available
المجلد
5
العدد
1
الصفحات
13-26
publication.type
International
رابط البحث
Not Available
المواد المرفقة
Not Available
الملخص
This paper introduces a new technique called Homotopy analysis Wiener Hermite expansion (HAM-WHE) which
considered as an extension to Wiener Hermite expansion linked with perturbation technique WHEP. The WHEP technique uses the
Wiener Hermite expansion and perturbation technique to solve a class of nonlinear partial differential equations with a perturbed
nonlinearity. The homotopy perturbation method (HPM) was used instead of the conventional perturbation methods which generalizes
the WHEP technique such that it can be applied to stochastic differential equations without the necessary of presence of the small
parameter. For more generalizing, the homotopy analysis method (HAM) is used instead of HPM; since HAM contains the control
parameter to guarantee the convergence of the solution and HPM is only a special case of HAM obtained at h¯ = −1 .The proposed
technique is applied on stochastic quadratic nonlinear diffusion problem to obtain some approximation orders of mean and variance
with making comparisons with HAM and homotopy-WHE to testify the method of analysis using symbolic computation software
Mathematica. The current work extends the use of WHEP for solving stochastic nonlinear differential equations.
considered as an extension to Wiener Hermite expansion linked with perturbation technique WHEP. The WHEP technique uses the
Wiener Hermite expansion and perturbation technique to solve a class of nonlinear partial differential equations with a perturbed
nonlinearity. The homotopy perturbation method (HPM) was used instead of the conventional perturbation methods which generalizes
the WHEP technique such that it can be applied to stochastic differential equations without the necessary of presence of the small
parameter. For more generalizing, the homotopy analysis method (HAM) is used instead of HPM; since HAM contains the control
parameter to guarantee the convergence of the solution and HPM is only a special case of HAM obtained at h¯ = −1 .The proposed
technique is applied on stochastic quadratic nonlinear diffusion problem to obtain some approximation orders of mean and variance
with making comparisons with HAM and homotopy-WHE to testify the method of analysis using symbolic computation software
Mathematica. The current work extends the use of WHEP for solving stochastic nonlinear differential equations.
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