| 管道热边界层方程的迎风有限元分析 |
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| 引用本文: | 张赞牢,唐晓寅,王建华,黄磊.管道热边界层方程的迎风有限元分析[J].后勤工程学院学报,2007,23(2):21-24. |
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| 作者姓名: | 张赞牢 唐晓寅 王建华 黄磊 |
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| 作者单位: | 1. 后勤工程学院,科研部,重庆,400016
2. 后勤工程学院,军事供油工程系,重庆,400016 |
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| 摘 要: | 对于管道热边界层方程,除了采用动量积分方法求得理论解析解外,也可以用数值方法求解,如有限差分、有限体积、有限元等方法.理论解析解是采用一定的简化并忽略若干项之后得到的,因此,也只是一种近似解,数值解可以考虑完整的方程和各种边界条件,因而其解较为全面.采用伽辽金有限元方法求解,管道热边界层方程为标准的对流扩散方程,当对流项较强时,需要采用迎风方法,因而也给出了迎风有限元方法的模型.
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| 关 键 词: | 管道 温度边界层 伽辽金法 迎风有限元 管道 边界层方程 有限元分析 Pipeline Boundary Layer Temperature 模型 迎风有限元方法 迎风方法 对流项 流扩散方程 标准 伽辽金 边界条件 数值解 近似解 简化 有限体积 有限差分 求解 |
| 文章编号: | 1672-7843(2007)02-0021-04 |
| 修稿时间: | 2006年10月28 |
Upwind Finite Element Method on Temperature Boundary Layer in Pipeline |
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| ZHANG Zanlao,TANG Xiaoyin,WANG Jianhua,HUANG Lei.Upwind Finite Element Method on Temperature Boundary Layer in Pipeline[J].Journal of Logistical Engineering University,2007,23(2):21-24. |
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| Authors: | ZHANG Zanlao TANG Xiaoyin WANG Jianhua HUANG Lei |
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| Abstract: | Not only adapting theory analyses method may be used to solve analyzing solution for temperature boundary layer in Pipeline, but also may be adapted computational method, such as Finite Difference Method, Finite Volume Method, Finite Element Method, and son. Theory analyses solution is acquired that is simplified and neglected several terms of equation. So, it is only approximate solution. Computational solution may be considered a whole equation and the more various boundary conditions. Hence, the solution is more complete and all-round. The equation of temperature boundary layer in Pipeline is solved by applying Galerkin's finite element method in the paper. For the convection and diffusion equation, when the convection terms is stronger, the upwind method is required to adapt. So , upwind finite element model is given out, too, in the paper. |
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