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عنوان
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A new reproducing kernel method for solving the second order partial differential equation
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نوع پژوهش
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مقاله چاپشده در مجلات علمی
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کلیدواژهها
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Reproducing kernel Hilbert space method, shifted Chebyshev polynomials, Convergence analysis, Second order linear partial differential equation
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چکیده
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In this study, a reproducing kernel Hilbert space method with the Chebyshev function is proposed for approximating solutions of a second-order linear partial differential equation under nonhomogeneous initial conditions. Based on reproducing kernel theory, reproducing kernel functions with a polynomial form will be erected in the reproducing kernel spaces spanned by the shifted Chebyshev polynomials. The exact solution is given by reproducing kernel functions in a series expansion form, the approximation solution is expressed by an n-term summation of reproducing kernel functions. This approximation converges to the exact solution of the partial differential equation when a sufficient number of terms are included. Convergence analysis of the proposed technique is theoretically investigated. This approach is successfully used for solving partial differential equations with nonhomogeneous boundary conditions.
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پژوهشگران
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محمدرضا فروتن (نفر اول)، سهیلا مروتی دارآباد (نفر دوم)، کمال فلاحی (نفر سوم)
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