Numerical solution of integrals and nonlinear integral equations by wavelets
In recent years, wavelets have found their way into many different fields of science and engineering. This is because wavelets possess several important properties, such as orthogonality, compact support, exact representation of polynomials at certain degree and the ability to represent functions...
Saved in:
| Main Author: | |
|---|---|
| Format: | Thesis |
| Language: | English |
| Published: |
2016
|
| Subjects: | |
| Online Access: | http://psasir.upm.edu.my/id/eprint/69757/1/IPM%202016%203%20-%20IR.pdf http://psasir.upm.edu.my/id/eprint/69757/ |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Summary: | In recent years, wavelets have found their way into many different fields of science
and engineering. This is because wavelets possess several important properties, such
as orthogonality, compact support, exact representation of polynomials at certain
degree and the ability to represent functions on different levels of resolution. In this
thesis, new methods based on wavelet expansion are considered to solve problems
arising in approximation of functions, integrals and integral equations. Mainly we
deal with the numerical approximations by Haar wavelets, linear Legendre multiwavelets
and Chebyshev wavelets.
Numerous work has been done to solve numerical integration in terms of quadrature
rule. Regardless of the simplicity of quadrature rule, there exist some drawbacks. In
order to overcome these existing drawbacks, new methods based on Haar wavelets
and linear Legendre multi-wavelets are proposed to obtain numerical solutions of
double, triple and N dimensional integrals. Main advantages of these methods are its
efficiency and simple applicability. Furthermore, the error analysis for double and
triple integral where functions belong in the class of C2(R) and C3(R) is worked out
to show the efficiency of the methods.
The second part of the thesis focus on obtaining error estimations for the approximation
by Haar and Chebyshev wavelets and linear Legendre multi wavelets. Error
estimations are established for functions from Holder Hs[0;1] and Holder Zygmund
Cm:a[0;1] classes. Therefore functions can be consider in a wider class compared to
the previous work. The smoothness of functions from Holder and Holder Zygmund
classes is reflected in the error estimation.
Finally, new numerical techniques to solve nonlinear Fredholm and Volterra integral
equation of the second kind by Haar and Chebyshev wavelets are developed. These
methods reduce the nonlinear integral equation to a linear algebraic system of equation.
Newton Kantorovich method is implemented to reduce the nonlinear integral
equations into linear integral equations. This allows us to establish approximation
solutions for nonlinear integrals. The comparison of error and accuracy between
other methods are shown. |
|---|