| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 782487 | International Journal of Mechanical Sciences | 2012 | 8 Pages |
Analytical solutions to the time-dependent, nonlinear equation governing incompressible, one dimensional flow in a pipe are presented. The flow is pressure-driven, and a valve on the pipe controls the flow rate. Power-law losses and an exponential closing action of a valve are assumed. Four different approximation methods are used. Of these, perturbation and Adomian's decomposition are seen to be valid only for small time. The WKB approximation works only for a quadratic loss term. Homotopy analysis is broadly applicable but needs parameter tuning, optimal values of which have been determined.
► Analytical solutions time-dependent, nonlinear equation governing incompressible, one dimensional flow in pipe are presented. ► Four different approximation methods are used. ► Homotopy analysis is broadly applicable but needs parameter tuning.
