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عنوان
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Existence of solutions for $k$-dimensional system of multi-term fractional $q$-integro-differential equations under anti-periodic boundary conditions via quantum calculus
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نوع پژوهش
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مقاله چاپشده در مجلات علمی
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کلیدواژهها
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fractional $q$-integro-differential equation, anti-periodic boundary conditions, fractional Caputo type $q$-derivative, $k$-dimentional system, quantum calculus
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چکیده
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We prove the existence and uniqueness of solutions for a $k$-dimensional system of multi-term fractional $q$-integro-differential equations via anti-periodic boundary conditions by using some well-known tools of fixed point technique such as Arzel\`{a}--Ascoli theorem. We firstly give the corresponding Green's function for the boundary value problem and some of its attributes. In addition to, we give a numeric method to verify the analysis for checking the existence of a solution of the system. Finally, an interesting example is presented to illustrate the results.
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پژوهشگران
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محمداسماعیل سامعی (نفر اول)، ونگ یانگ (نفر دوم)
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