Unsteady flow of an incompressible Maxwell fluid with fractional derivative induced by a sudden moved plate has been studied, where the no-slip assumption between the wall and the fluid is no longer valid. The solutions obtained for the velocity field and shear stress, written in terms of Wright generalized hypergeometric functions e????¨e???, by using discrete Laplace transform of the sequential fractional derivatives, satisfy all imposed initial and boundary conditions. The no-slip contributions, that appeared in the general solutions, as expected, tend to zero when slip parameter is e???a??0. Furthermore, the solutions for ordinary Maxwell and Newtonian fluids, performing the same motion, are obtained as special cases of general solutions. The solutions for fractional and ordinary Maxwell fluid for no-slip condition also obtained as limiting cases, and they are equivalent to the previously known results. Finally, the influence of the material, slip, and the fractional parameters on the fluid motion as well as a comparison among fractional Maxwell, ordinary Maxwell, and Newtonian fluids is also discussed by graphical illustrations.
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机译:已经研究了由突然移动的板引起的具有分数导数的不可压缩麦克斯韦流体的非恒定流动,其中壁与流体之间的无滑动假设不再有效。通过使用连续分数阶导数的离散Laplace变换,以Wright广义超几何函数e?形式表示的针对速度场和切应力的解满足所有强加的初始条件和边界条件。如预期的那样,一般解决方案中出现的无滑移贡献,当滑移参数为e ??? a ?? 0时,趋向于零。此外,作为一般解的特殊情况,可以获得执行相同运动的普通麦克斯韦和牛顿流体的解。极限情况下,也获得了在无滑移条件下的分形和普通麦克斯韦流体的解决方案,它们与以前的结果相当。最后,还通过图形说明讨论了材料,滑移和分数参数对流体运动的影响,以及分数麦克斯韦,普通麦克斯韦和牛顿流体之间的比较。
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