| 排灌输水隧洞正常水深的简捷算法 |
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| 引用本文: | 赵延风,王正中,方兴,刘计良,洪安宇.排灌输水隧洞正常水深的简捷算法[J].排灌机械,2011,29(6):523-528. |
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| 作者姓名: | 赵延风 王正中 方兴 刘计良 洪安宇 |
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| 作者单位: | 1. 西北农林科技大学水利水电工程研究所,陕西杨凌,712100
2. 奥本大学土木工程系,美国阿拉巴马州 奥本36849 |
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| 基金项目: | 国家863计划项目(2002AA62Z3191); 陕西省农业科技创新项目(2011NXC01-20) |
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| 摘 要: | 为了使标准城门洞形断面正常水深的求解具有简单的显函数计算公式,对标准城门洞形断面正常水深的基本方程进行恒等变形,将水面位于底角圆弧段和顶弧段正常水深的超越方程以及水面位于侧边直线段正常水深的高次方程,变成无量纲化正常水深与已知量综合参数的单变量函数方程.引入准线性函数的概念并将准线性函数作为标准模板,再对正常水深的单变量函数方程应用准线性函数标准模板,在工程常用范围即无量纲化正常水深y∈0.051,.80]范围内进行优化计算及准线性函数逼近,得到了超越方程和高次方程的替代函数方程,替代函数具有类似于线性函数形式,即正常水深的准线性显函数表达式,并进行误差分析.结果表明,在隧洞底部圆弧段正常水深的最大相对误差小于0.36%,侧边直线段正常水深的最大相对误差小于0.31%,顶弧段正常水深的最大相对误差小于0.39%,说明准线性公式在隧洞有效水深范围内计算的水深准确度较高,可为排灌输水隧洞的断面设计及实现渠道水位控制时确定均匀流水深提供参考.
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| 关 键 词: | 排灌输水隧洞 标准城门洞 正常水深 准线性函数 函数逼近 |
Simple calculation method for normal depth of a kind of water supply tunnel for irrigation and drainage |
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| Zhao Yanfeng,Wang Zhengzhong,Fang Xing,Liu Jiliang,Hong Anyu.Simple calculation method for normal depth of a kind of water supply tunnel for irrigation and drainage[J].Drainage and Irrigation Machinery,2011,29(6):523-528. |
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| Authors: | Zhao Yanfeng Wang Zhengzhong Fang Xing Liu Jiliang Hong Anyu |
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| Institution: | Zhao Yanfeng1,Wang Zhengzhong1,Fang Xing2,Liu Jiliang1,Hong Anyu1 1.Institute of Water Resources and Hydropower Engineering,Northwest A & F University,Yangling,Shaanxi 712100,China,2.Department of Civil Engineering,Auburn University,Auburn,Alabama 36849,U.S.A.) |
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| Abstract: | In order to obtain an explicit formula for normal depth of standard city-gate section,first,the identical transformation of the governing equation for normal depth of standard city-gate section was made,including the transcendental equation for normal depth in the bottom corner arc and the top arc,and the higher-degree equation for normal depth in the lateral side.The single variable equation was obtained for dimensionless normal depth and the comprehensive parameter of the known quantities.Second,the conce... |
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| Keywords: | water supply tunnel for irrigation and drainage standard city-gate cross section normal depth quasi-linear function function approximation |
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