Korkmaz A., On the wave solutions of conformable fractional evolution equations, Communications Series A1: Mathematics and Statistics, 67, 1, 68-79, 2018.
Korkmaz A., On the wave solutions of conformable fractional evolution equations, Communications Series A1: Mathematics and Statistics, 67, 1, 68-79, 2018.
Korkmaz A., On the wave solutions of conformable fractional evolution equations, Communications Series A1: Mathematics and Statistics, 67, 1, 68-79, 2018.
Korkmaz A., On the wave solutions of conformable fractional evolution equations, Communications Series A1: Mathematics and Statistics, 67, 1, 68-79, 2018.
Abstract
The exact solutions in the wave form are derived for the time fractional KdV and the time fractional Burgers' equations in conformable fractional derivative sense. The fractional variable change using the fundamental properties of the conformable derivative reduces both equations to some nonlinear ODEs. The predicted solution is assumed to be a finite series form of a function satisfying a particular first-order ODE whose solution contains an exponential function in the denominator. The solutions are represented in the explicit forms and illustrated by some choices of the parameters for various fractional orders of the equations.
Keywords
time fractional KdV equation; time fractional Burgers equation; Kudryashov method; wave solution
Subject
Computer Science and Mathematics, Applied Mathematics
Copyright:
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