| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4632507 | Applied Mathematics and Computation | 2010 | 6 Pages |
The problem of the Swift–Hohenberg equation is considered in this paper. Using homotopy analysis method (HAM) the series solution is developed and its convergence is discussed and documented here for the first time. In particular, we focus on the roles of the eigenvalue parameter αα and the length parameter l on the large time behaviour of the solution. For a given time t , we obtain analytical expressions for eigenvalue parameter αα and length l which show how different values of these parameters may lead to qualitatively different large time profiles. Also, the results are presented graphically. The results obtained reveal many interesting behaviors that warrant further study of the equations related to non-Newtonian fluid phenomena, especially the shear-thinning phenomena. Shear thinning reduces the wall shear stress.
