شماره ركورد كنفرانس :
4079
عنوان مقاله :
Triangular functions operational matrix method for solving nonlinear fractional integro-differential equations with weakly singular kernel
پديدآورندگان :
Atabak Sayed Saeid ssatabak@gmail.com Hakim Sabzevari University , Khodadad Mohammad Taghi khodadad44@gmail.com Hakim Sabzevari University
كليدواژه :
Volterra integro , differential equations of fractional order , Triangular functions , Operational matrix , Riemann , Liouville fractional integration , Caputo derivative.
عنوان كنفرانس :
چهل و هفتمين كنفرانس رياضي ايران
چكيده فارسي :
In this paper, triangular functions method combining with its operational matrix of fractional
integration are applied to the numerical solution of nonlinear fractional Volterra integrodifferential
equations with weakly singular kernel. The main purpose of this technique is to
transform the initial equation into a nonlinear system of algebraic equations which can be solved
easily. In the end, we solve an example by this method and also, by block pulse functions method
and Haar wavelets method. The approximate solutions obtained by these methods are compared
together.
