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صفحه نخست /A NOVEL NUMERICAL METHOD FOR ...
عنوان A NOVEL NUMERICAL METHOD FOR SOLVING FUZZY VARIABLE-ORDER DIFFERENTIAL EQUATIONS WITH MITTAG-LEFFLER KERNELS
نوع پژوهش مقاله چاپ شده
کلیدواژه‌ها Atangana–Baleanu–Caputo Derivative; Fixed and Variable Order; Fuzzy Fractional Differential Equations; The Shifted Legendre Polynomials; Operational Matrix
چکیده In the fuzzy calculus, the study of fuzzy differential equations (FDEs) created a proper setting to model real problems which contain vagueness or uncertainties factors. In this paper, we consider a class fuzzy differential equations (FFDEs) with non-integer or variable order (VO). The variable order derivative is defined in the Atangana–Baleanu–Caputo sense on fuzzy setvalued functions. The main problem under the fuzzy initial condition is converted to a new problem by the r-cut representation of fuzzy-valued function. For solving the new problem, we use the operational matrices (OMs) based on the shifted Legendre polynomials (SLPs). By approximating the unknown function and its derivative in terms of the SLPs and substituting these approximations into the equation, the main problem is converted to a system of nonlinear algebraic equations. An error estimate of the numerical solution is proved. Finally, an example is considered to confirm the accuracy of the proposed technique
پژوهشگران یوسف س قاسیموف (نفر پنجم)، زکیه حموش (نفر چهارم)، داوود دومیری گنجی (نفر سوم)، رقیه معلم گنجی (نفر دوم)، حسین جعفری (نفر اول)