Abstract
A finite integration method is proposed in this paper to deal with partial differential equations in which the finite integration matrices of the first order are constructed by using both standard integral algorithm and radial basis functions interpolation respectively. These matrices of first order can directly be used to obtain finite integration matrices of higher order. Combining with the Laplace transform technique, the finite integration method is extended to solve time dependent partial differential equations. The accuracy of both the finite integration method and finite difference method are demonstrated with several examples. It has been observed that the finite integration method using either radial basis function or simple linear approximation gives a much higher degree of accuracy than the traditional finite difference method. © 2013 Elsevier Inc.
| Original language | English |
|---|---|
| Pages (from-to) | 10092-10106 |
| Journal | Applied Mathematical Modelling |
| Volume | 37 |
| Issue number | 24 |
| Online published | 22 Jun 2013 |
| DOIs | |
| Publication status | Published - 15 Dec 2013 |
Research Keywords
- Elasto-dynamics
- Finite integral method
- Laplace transformation
- Partial differential equation
- Partial differential equation with fractional order
- Radial basis functions