Mirkamal Mirnia
Department of Applied Mathematics, Faculty of Mathematical Sciences, University of Tabriz
[ 1 ] - Solution of Bang-Bang Optimal Control Problems by Using Bezier Polynomials
In this paper, a new numerical method is presented for solving the optimal control problems of Bang-Bang type with free or fixed terminal time. The method is based on Bezier polynomials which are presented in any interval as $[t_0,t_f]$. The problems are reduced to a constrained problems which can be solved by using Lagrangian method. The constraints of these problems are terminal state and con...
[ 2 ] - Piecewise cubic interpolation of fuzzy data based on B-spline basis functions
In this paper fuzzy piecewise cubic interpolation is constructed for fuzzy data based on B-spline basis functions. We add two new additional conditions which guarantee uniqueness of fuzzy B-spline interpolation.Other conditions are imposed on the interpolation data to guarantee that the interpolation function to be a well-defined fuzzy function. Finally some examples are given to illustrate the...
[ 3 ] - FUZZY INTEGRO-DIFFERENTIAL EQUATIONS: DISCRETE SOLUTION AND ERROR ESTIMATION
This paper investigates existence and uniqueness results for the first order fuzzy integro-differential equations. Then numerical results and error bound based on the left rectangular quadrature rule, trapezoidal rule and a hybrid of them are obtained. Finally an example is given to illustrate the performance of the methods.
[ 4 ] - SOLVING FUZZY LINEAR SYSTEMS BY USING THE SCHUR COMPLEMENT WHEN COEFFICIENT MATRIX IS AN M-MATRIX
This paper analyzes a linear system of equations when the righthandside is a fuzzy vector and the coefficient matrix is a crisp M-matrix. Thefuzzy linear system (FLS) is converted to the equivalent crisp system withcoefficient matrix of dimension 2n × 2n. However, solving this crisp system isdifficult for large n because of dimensionality problems . It is shown that thisdifficulty may be avoide...
[ 5 ] - درونیابی هموگرافیک
بسیاری از توابع با جدول مقادیر آنها در تعدادی نقطه، مشخص هستند. در عین حال لازم است ضابطۀ آنها در صورت امکان حتی به طور تقریبی، معلوم باشد. از آنجا که از مشتقات این گونه توابع اطلاعات کمی در دسترس است، به جای استفاده از درونیابی چندجمله ای با درجۀ بالا، ترجیح داده می شود از اسپلاین مکعبی استفاده شود. چنانچه جوانب احتیاط را رعایت کنیم می توانیم اسپلاین مرتبه یک و دو را هم به کار ببریم. در عمل نش...
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