On the problem of determining the separation point of the laminar boundary layer by the example of the Howart–Tani flow

V. A. Kot
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Abstract

A new approach is proposed how to calculate the laminar boundary layer in slow flows. It is based on describing the velocity profile using a polynomial of indefinite degree and on introducing two additional coordinate-dependent parameters, one of which defines the separation of the boundary layer from a wall once this parameter reaches zero. The approach based on three integral relations and reducing the problem to the system of three ordinary differential equations was further developed. A numerical analysis performed for the Howart–Tani flow showed that the separation point of a laminar boundary layer is determined highly exactly using this approach. It was shown that introducing into consideration certain restrictions for the outer surface of a boundary layer allows one to find the problem solutions which would adequately define and fairly exactly determine the flow velocity distribution within this layer, and at any point up to the point of its separation. The proposed numerical-analytical calculation method based on three integral relations and two additional parameters and involving the definition of the flow velocity profile by a polynomial of indefinite degree can be extended to other slow flows past smooth two-dimensional surfaces.
以 Howart-Tani 流为例论证层状边界层分离点的确定问题
本文提出了一种计算慢速流动中层流边界层的新方法。它的基础是使用不确定度的多项式描述速度剖面,并引入两个额外的坐标参数,其中一个参数定义了边界层与壁的分离,一旦该参数为零。基于三个积分关系并将问题简化为三个常微分方程系统的方法得到了进一步发展。对 Howart-Tani 流动进行的数值分析表明,层流边界层的分离点可以用这种方法高度精确地确定。结果表明,考虑到对边界层外表面的某些限制,可以找到问题的解决方案,从而充分定义并相当精确地确定边界层内以及边界层分离点之前任何一点的流速分布。所提出的基于三个积分关系和两个附加参数的数值-分析计算方法,涉及用一个不确定度的多项式定义流速剖面,可以扩展到经过光滑二维表面的其他慢速流动。
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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