On flow of power-law fluids between adjacent surfaces: Why is it possible to derive a Reynolds-type equation for pressure-driven flow, but not for shear-driven flow?

IF 2.2 Q2 ENGINEERING, MULTIDISCIPLINARY
Andreas Almqvist , Evgeniya Burtseva , Kumbakonam Rajagopal , Peter Wall
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Abstract

Flows of incompressible Navier–Stokes (Newtonian) fluids between adjacent surfaces are encountered in numerous practical applications, such as seal leakage and bearing lubrication. In seals, the flow is primarily pressure-driven, whereas, in bearings, the dominating driving force is due to shear. The governing Navier–Stokes system of equations can be significantly simplified due to the small distance between the surfaces compared to their size. From the simplified system, it is possible to derive a single lower-dimensional equation, known as the Reynolds equation, which describes the pressure field. Once the pressure field is computed, it can be used to determine the velocity field. This computational algorithm is much simpler to implement than a direct numerical solution of the Navier–Stokes equations and is therefore widely employed by engineers. The primary objective of this article is to investigate the possibility of deriving a type of Reynolds equation also for non-Newtonian fluids, using the balance of linear momentum. By considering power-law fluids we demonstrate that it is not possible for shear-driven flows, whereas it is feasible for pressure-driven flows. Additionally, we demonstrate that in the full 3D model, a normal stress boundary condition at the inlet/outlet implies a Dirichlet condition for the pressure in the Reynolds equation associated with pressure-driven flow. Furthermore, we establish that a Dirichlet condition for the velocity at the inlet/outlet in the 3D model results in a Neumann condition for the pressure in the Reynolds equation.

Abstract Image

幂律流体在相邻表面之间的流动:为什么可以推导出压力驱动流动的雷诺方程,而不能推导出剪切驱动流动的雷诺方程?
在许多实际应用中,如密封泄漏和轴承润滑,都会遇到相邻表面之间不可压缩的Navier-Stokes(牛顿)流体的流动。在密封件中,流动主要由压力驱动,而在轴承中,主要的驱动力是由剪切引起的。由于表面之间的距离与其大小相比较小,因此可以显著简化Navier-Stokes方程组。从简化的系统中,可以导出一个单一的低维方程,称为雷诺方程,用于描述压力场。一旦计算出压力场,就可以用来确定速度场。这种计算算法比Navier–Stokes方程的直接数值解更容易实现,因此被工程师广泛使用。本文的主要目的是研究利用线性动量平衡推导非牛顿流体雷诺方程的可能性。通过考虑幂律流体,我们证明了剪切驱动流是不可能的,而压力驱动流是可行的。此外,我们证明,在全三维模型中,入口/出口处的法向应力边界条件意味着雷诺方程中与压力驱动流相关的压力的狄利克雷条件。此外,我们建立了三维模型中入口/出口速度的狄利克雷条件导致雷诺方程中压力的诺依曼条件。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Applications in engineering science
Applications in engineering science Mechanical Engineering
CiteScore
3.60
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审稿时长
68 days
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