The Boundary Layer Equations and a Dimensional Split Method for Navier-Stokes Equations in Exterior Domain of a Spheroid and Ellipsoid

Jian Su, H. Fan, Weibing Feng, Hao Chen, Kaitai Li
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Abstract

In this paper, the boundary layer equations (abbreviation BLE) for exterior flow around an obstacle are established using semi-geodesic coordinate system (S-coordinate) based on the curved two dimensional surface of the obstacle. BLE are nonlinear partial differential equations on unknown normal viscous stress tensor and pressure on the obstacle and the existence of solution of BLE is proved. In addition a dimensional split method for dimensional three Navier-Stokes equations is established by applying several 2D-3C partial differential equations on two dimensional manifolds to approach 3D Navier-Stokes equations. The examples for the exterior flow around spheroid and ellipsoid are presents here.
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椭球和椭球外域Navier-Stokes方程的边界层方程及维数分割方法
本文以障碍物的二维曲面为基础,采用半测地线坐标系(s坐标),建立了障碍物外部绕流的边界层方程(简称BLE)。它是关于未知法向粘性应力张量和障碍物压力的非线性偏微分方程,并证明了其解的存在性。此外,利用二维流形上的若干2D-3C偏微分方程逼近三维Navier-Stokes方程,建立了三维Navier-Stokes方程的一维分裂方法。本文给出了围绕椭球体和椭球体的外流的实例。
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