fa یک روش طیفی برپایه چندجمله ای های هان برای حل عددی معادلات انتگرال-دیفرانسیل مرتبه کسری با هسته به طور ضعیف منفرد جبر alg مقاله مستقل Original Manuscript <div style="text-align: justify;"><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">در این مقاله، چندجمله</span></span><span style="font-family:B Nazanin;"><span style="font-size:12.0pt;">&shy;</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">ای</span></span><span style="font-family:B Nazanin;"><span style="font-size:12.0pt;">&shy;</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">های گسسته هان وکاربرد آنها برای حل عددی معادلات انتگرال-دیفرانسیل مرتبه کسری به‌طور ضعیف منفرد بررسی می‌شوند. این مقاله، برای اولین بار ماتریس عملیاتی انتگرال مرتبه کسری چندجمله</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">ای</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">های هان را ارائه می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">کند و با استفاده از آن معادله انتگرال مورد نظر به یک دستگاه معادلات جبری تبدیل می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">شود. هم‌چنین در این مقاله کران بالای خطای تقریب یک تابع بهوسیلۀ این چندجمله‌ای‌ها محاسبه می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">شود. سپس با حل چند مثال عددی نشان داده می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">شود که با به‌کارگیری تعداد کمی از جملات بسط نتایج قابل قبولی حاصل می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">شوند که با نتایج حاصل از روش</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">های دیگر مقایسه می</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">شوند. دقت قابل قبول به همراه روند پیاده</span></span><span style="font-family:Times New Roman,serif;"><span style="font-size:10.0pt;">‌</span></span><span style="font-family:B Nazanin;"><span style="font-size:10.0pt;">سازی ساده، از خصوصیات روش مورد بحث است. </span></span><span dir="RTL"> </span></div> <div style="text-align: justify;"><strong>Introduction</strong><br> Despite wide applications of constant order fractional derivatives, some systems require the use of derivatives whose order changes with respect to other parameters. Samko and Ross produced an extension of the classical fractional calculus with a continuously varying order for differential and integral operators. Variable-order fractional (V-OF) calculus has applications in optimal control, processing of geographical data, diffusion processes, description of anomalous diffusion, heat-transfer problems, etc. Due to the V-OF operators which are non-local with singular kernels, finding the exact solutions of V-OF problems is difficult. Therefore, efficient numerical techniques are necessary to be developed. The numerical solution of V-OF differential equation has been considered in some papers.<br> &nbsp;&nbsp;&nbsp; Recently, discrete orthogonal polynomials have been considered as basis functions instead of continuous orthogonal polynomials. Discrete orthogonal polynomials are orthogonal with respect to a weighted discrete inner product. These polynomials have important applications in chemical engineering, theory of random matrices, queuing theory and image coding. In this paper, we focus on a special class of discrete polynomials, called Hahn polynomials.<br> &nbsp;&nbsp;&nbsp; In this work, first, a new operational matrix is obtained for V-OF integral of Hahn polynomials. Then, we use a spectral collocation technique combined with the associated operational matrices of V-OF integral for solving weakly singular fractional integro-differential equations.<br> <strong>Material and methods</strong><br> In this scheme, the operational matrix of fractional integration of Hahn polynomials is calculated. This method converts the weakly singular fractional integro-differential equations into an algebraic system which can be solved by a technique of linear algebra.<br> <strong>Results and discussion</strong><br> In this paper, some numerical examples are provided to show the accuracy and efficiency of the presented method. By using a small number of Hahn polynomials, significant results are achieved which are compared to other methods. A comparison to the numerical solutions by CAS and Haar wavelets and Adomain decomposition method, shows that this technique is accurate enough to be known as a powerful device.<br> <strong>Conclusion</strong><br> The following results are obtained from this research.<span dir="RTL"></span> <ul> <li>The operational matrix of fractional integration of Hahn polynomials is presented for the first time.</li> <li>The main advantage of approximating a continuous function by Hahn polynomials is that they have a spectral accuracy at interval [0,N], where N is the number of bases.</li> <li>Furthermore, for estimating the coefficients of the expansion of approximate solution, we only have to compute a summation which is calculated exactly.</li> <li>Using Hahn polynomials, the numerical results achieved only by a small number of bases, are accurate in a larger interval and significant results are achieved.<a href="./files/site1/files/61/7.pdf">./files/site1/files/61/7.pdf</a></li> </ul> </div> معادلات انتگرال-دیفرانسیل مرتبه کسری منفرد ضعیف, چندجمله ای های هان, ماتریس عملیاتی, روش طیفی Weakly Singular Fractional Integro-Differential Equations, Hahn Polynomials, Operational Matrix, Spectral method 65 78 http://mmr.khu.ac.ir/browse.php?a_code=A-10-399-1&slc_lang=fa&sid=1 Farideh Salehi فریده صالحی f.salehi630@gmail.com 10031947532846003586 10031947532846003586 No دانشگاه آزاد اسلامی واحد کرمان، دانشکدۀ ریاضی، Habibollah Saeedi حبیب اله سعیدی saeedi@uk.ac.ir 10031947532846003587 10031947532846003587 Yes دانشگاه شهید باهنرکرمان، دانشکدۀ ریاضی و کامپیوتر، Mahmoud Mohseni Moghadam محمود محسنی مقدم mohseeni@uk.ac.ir 10031947532846003588 10031947532846003588 No دانشگاه آزاد اسلامی واحد کرمان، دانشکدۀ ریاضی