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Solutions to Uncertain Volterra Integral Equations by Fitted Reproducing Kernel Hilbert Space Method
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نویسنده
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gumah g. ,moaddy k. ,al-smadi m. ,hashim i.
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منبع
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journal of function spaces - 2016 - دوره : 2016 - شماره : 0
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چکیده
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We present an efficient modern strategy for solving some well-known classes of uncertain integral equations arising in engineering and physics fields. the solution methodology is based on generating an orthogonal basis upon the obtained kernel function in the hilbert space w 2 1 a,b in order to formulate the analytical solutions in a rapidly convergent series form in terms of their α -cut representation. the approximation solution is expressed by n -term summation of reproducing kernel functions and it is convergent to the analytical solution. our investigations indicate that there is excellent agreement between the numerical results and the rkhs method,which is applied to some computational experiments to demonstrate the validity,performance,and superiority of the method. the present work shows the potential of the rkhs technique in solving such uncertain integral equations. © 2016 ghaleb gumah et al.
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آدرس
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faculty of engineering technology,al-balqa applied university,amman, Jordan, department of mathematics,faculty of science and arts,shaqra university,shaqra, Saudi Arabia, department of applied science,ajloun college,al-balqa applied university,ajloun, Jordan, school of mathematical sciences,universiti kebangsaan malaysia,bangi,selangor,malaysia,research institute,center for modeling and computer simulation (ri/cm and cs),king fahd university of petroleum and minerals,dharan, Saudi Arabia
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Authors
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