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عنوان
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A semi‐analytical approach for fractional order Boussinesq equation in a gradient unconfined aquifers
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نوع پژوهش
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مقاله چاپ شده
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کلیدواژهها
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Antagana-Baleanu fractional derivative, Boussinesq equation, convergence analysis, fractional calculus, Mittag-Leffler type function, new iterative transform method
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چکیده
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In this investigation, we propose a semi-analytical technique to solve the fractional order Boussinesq equation (BsEq) that pertains the groundwater level in a gradient unconfined aquifer having an impervious extremity. With the aid of Antagana-Baleanu fractional derivative operator and Laplace transform, several novel approximate-analytical solutions of the fourth-order time-fractional BsEq in R, Rn and the 2nd-order in R are derived. We analyze the most dominant ideology of differentiation, including the nonsingular kernel relying on the extended Mittag-Leffler type function to modify BsEq. Furthermore, we demonstrate the existence and uniqueness of the solution for the non-linear fractional BsEq. The present method is appealing and the simplistic methodology indicates that it could be straightforwardly protracted to solve various nonlinear fractional-order partial differential equations.
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پژوهشگران
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ثنالله لهره (نفر چهارم)، حسین جعفری (نفر سوم)، خدیجه ت کبری (نفر دوم)، سیما رشید (نفر اول)
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