Invariant characterization of third-order ordinary differential equations u''=f(x,u,u',u) with five-dimensional point symmetry group
Author | Al-Dweik A.Y. |
Author | Mahomed F.M. |
Author | Mustafa M.T. |
Available date | 2020-04-25T01:02:22Z |
Publication Date | 2019 |
Publication Name | Communications in Nonlinear Science and Numerical Simulation |
Resource | Scopus |
ISSN | 10075704 |
Abstract | The Cartan equivalence method is applied to provide an invariant characterization of the third-order ordinary differential equation u''=f(x,u,u',u') which admits a five-dimensional point symmetry Lie algebra. The invariant characterization is given in terms of the function f in a compact form. A simple procedure to construct the equivalent canonical form by use of an obtained constant invariant is also presented. We also show how one obtains the point transformation that does the reduction to linear form. Moreover, some applications are provided. |
Language | en |
Publisher | Elsevier B.V. |
Subject | Cartans equivalence method Invariant characterization Lie point symmetry Scalar third-order ordinary differential equation |
Type | Article |
Pagination | 627-636 |
Volume Number | 67 |
Check access options
Files in this item
Files | Size | Format | View |
---|---|---|---|
There are no files associated with this item. |
This item appears in the following Collection(s)
-
Mathematics, Statistics & Physics [740 items ]