In this paper, a numerical method is proposed to solve the Fredholm-Volterra fractional integro-differential equation with nonlocal boundary conditions by using Haar wavelets. A collocation based Galerkin’s method is applied by using Haar wavelets as basis functions over the interval [0, 1). It converts the Fredholm-Volterra fractional integro-differential equation into a system of m linear equations. On incorporating q nonlocal boundary conditions, it leads to further q equations. All together it will give a system of (m + q) linear equations in (m + q) variables which can be solved. A variety of test examples are considered to illustrate the proposed method. The actual error is also measured with respect to a norm and the results are validated through error bounds.

Topics
Finite-element analysis, Integro-differential equation, Educational assessment
1.
L.
Zhu
 and
Q.
Fan
,
Communications in Nonlinear Science and Numerical Simulation
18
,
1203
1213
(
2015
).
https://doi.org/10.1016/j.cnsns.2012.09.024
Google Scholar
Crossref
Search ADS
 
2.
J.
Majak
,
B.
Shvartsman
,
M.
Kirsa
,
M.
Pohlak
, and
H.
Herranen
,
Composite Structures
126
,
227
232
(
2015
).
https://doi.org/10.1016/j.compstruct.2015.02.050
Google Scholar
Crossref
Search ADS
 
3.
A.
Setia
,
Y.
Liu
, and
A.S.
Vatsala
,
Journal of fractional calculus and applications
5
,
155
165
(
2014
).
Google Scholar
 
4.
A.
Kilicman
 and
A.
Zhour
,
Applied Mathematics and Computation
187
,
250
265
(
2007
).
https://doi.org/10.1016/j.amc.2006.08.122
Google Scholar
Crossref
Search ADS
 
5.
Y.
Chen
,
M.
Yi
, and
C.
Yu
,
Journal of Computational Science
3
,
367
373
(
2012
).
https://doi.org/10.1016/j.jocs.2012.04.008
Google Scholar
Crossref
Search ADS
 
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