Numerical solution of elliptic partial differential equations by haar wavelet operational matrix method / Nor Artisham Che Ghani
The purpose of this study is to establish a simple numerical method based on the Haar wavelet operational matrix of integration for solving two dimensional elliptic partial differential equations of the form, Ñ2u(x, y) + ku(x, y) = f (x, y) with the Dirichlet boundary conditions. To achieve the t...
Saved in:
| Main Author: | |
|---|---|
| Format: | Thesis |
| Published: |
2012
|
| Subjects: | |
| Online Access: | http://studentsrepo.um.edu.my/4463/1/Numerical_Solution_of_Elliptic_Partial_Differential_Equations_by_Haar_Wavelet_Operational_Matrix_Method.pdf http://studentsrepo.um.edu.my/4463/ |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Institution: | Universiti Malaya |
| Summary: | The purpose of this study is to establish a simple numerical method based on the
Haar wavelet operational matrix of integration for solving two dimensional elliptic partial
differential equations of the form, Ñ2u(x, y) + ku(x, y) = f (x, y) with the Dirichlet
boundary conditions. To achieve the target, the Haar wavelet series were studied, which
came from the expansion for any two dimensional functions g(x, y) defined on
L2 ([0,1)´ [0,1)), i.e. g(x, y) =Σc h (x)h ( y) ij i j or compactly written as HT (x)CH( y) ,
where C is the coefficient matrix and H(x) or H( y) is a Haar function vector. Wu (2009)
had previously used this expansion to solve first order partial differential equations. In this
work, we extend this method to the solution of second order partial differential equations.
The main idea behind the Haar operational matrix for solving the second order
partial differential equations is the determination of the coefficient matrix, C. If the
function f (x, y) is known, then C can be easily computed as H × F × HT , where F is the
discrete form for f (x, y) . However, if the function u(x, y) appears as the dependent
variable in the elliptic equation, the highest partial derivatives are first expanded as Haar
wavelet series, i.e. u HT (x)CH( y)
xx = and u HT (x)DH( y)
yy = , and the coefficient
matrices C and D usually can be solved by using Lyapunov or Sylvester type equation.
Then, the solution u(x, y) can easily be obtained through Haar operational matrix. The key
to this is the identification for the form of coefficient matrix when the function is separable.
Three types of elliptic equations solved by the new method are demonstrated and
the results are then compared with exact solution given. For the beginning, the computation
iii
was carried out for lower resolution. As expected, the more accurate results can be obtained
by increasing the resolution and the convergence are faster at collocation points.
This research is preliminary work on two dimensional space elliptic equation via
Haar wavelet operational matrix method. |
|---|