The numerical solution of fractional Korteweg-de Vries and Burgers'
equations via Haar wavelet
- Laique Zada,
- Imran Aziz
Abstract
In this article, Haar wavelet collocation technique is adapted to
acquire the approximate solution of fractional KdV, Burgers' and
KdV-Burgers' equations. The fractional order derivatives involved are
described using the Caputo definition. In the proposed technique, the
given nonlinear fractional differential equation is discretized with the
help of Haar wavelet and reduced to the nonlinear system of equations,
which are solved with Newton's or Broyden's method. The proposed method
is semi-analytic as it involves exact integration of Caputo derivative.
The proposed technique is widely applicable and robust. The technique is
tested upon many test problems. The results are computed and presented
in the form of maximum absolute errors which shows the accuracy,
efficiency and simple applicability of the proposed method.30 Jul 2020Submitted to Mathematical Methods in the Applied Sciences 31 Jul 2020Submission Checks Completed
31 Jul 2020Assigned to Editor
08 Aug 2020Reviewer(s) Assigned
16 Dec 2020Review(s) Completed, Editorial Evaluation Pending
25 Feb 2021Editorial Decision: Revise Minor
24 Mar 20211st Revision Received
24 Mar 2021Submission Checks Completed
24 Mar 2021Assigned to Editor
24 Mar 2021Editorial Decision: Accept