TRAVELLING WAVE SOLUTIONS FOR THE UNSTEADY FLOW OF A THIRD GRADE FLUID INDUCED DUE TO IMPULSIVE MOTION OF FLAT POROUS PLATE EMBEDDED IN A POROUS MEDIUM

被引:31
作者
Aziz, T. [1 ]
Mahomed, F. M. [1 ]
Shahzad, A. [2 ]
Ali, R. [3 ]
机构
[1] Univ Witwatersrand, Sch Computat & Appl Math, Ctr Differential Equat Continuum Mech & Applicat, ZA-2050 Johannesburg, South Africa
[2] Quaid I Azam Univ, Dept Math, Islamabad 45320, Pakistan
[3] Tech Univ Dortmund, Dept Appl Math, LS III, Dortmund, Germany
来源
JOURNAL OF MECHANICS | 2014年 / 30卷 / 05期
基金
新加坡国家研究基金会;
关键词
Third grade fluid; Suction/Injection; Travelling wave solutions; Homotopy analysis method (HAM); NON-NEWTONIAN FLUID; HOMOTOPY ANALYSIS METHOD; THIN-FILM FLOW; 3RD-GRADE FLUID; 2ND-GRADE FLUID; ANALYTIC SOLUTION; HALF-SPACE; EQUATIONS; SURFACE;
D O I
10.1017/jmech.2014.17
中图分类号
O3 [力学];
学科分类号
08 ; 0801 ;
摘要
This work describes the time-dependent flow of an incompressible third grade fluid filling the porous half space over an infinite porous plate. The flow is induced due to the motion of the porous plate in its own plane with an arbitrary velocity V(t). Translational type symmetries are employed to perform the travelling wave reduction into an ordinary differential equation of the governing nonlinear partial differential equation which arises from the laws of mass and momentum. The reduced ordinary differential equation is solved exactly, for a particular case, as well as by using the homotopy analysis method (HAM). The better solution from the physical point of view is argued to be the HAM solution. The essentials features of the various emerging parameters of the flow problem are presented and discussed.
引用
收藏
页码:527 / 535
页数:9
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