拱坝体型的静力自控制设计
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摘要
将结构的形式视为可变控制量 ,考虑结构的整体稳定性、安全性和经济性的要求 ,建立了弹性静结构的形式自控制模型 ,并采用离散—优化方法进行数值求解 .以拱坝体型的静力自控制问题为例 ,对拱坝 6种体型优化分析表明 ,当拱坝体型为一般二次曲线时 ,得到的自控制体型为最优
Taking the structure's type as a controlled variation, and considering demands of stability, safety and economy, a self-controlled model of an elastic static structure was established, and a numerical solution was obtained by optimization and discreteness. The shape design of an arch dam was taken as an example. Analytical results of optimized six types of dam shapes show that the self controlled shape is the most optimistic when a dam's shape is a general double curve.
Taking the structure's type as a controlled variation, and considering demands of stability, safety and economy, a self-controlled model of an elastic static structure was established, and a numerical solution was obtained by optimization and discreteness. The shape design of an arch dam was taken as an example. Analytical results of optimized six types of dam shapes show that the self controlled shape is the most optimistic when a dam's shape is a general double curve.
引文
[1] 王康宁.最优控制的数学理论[M].北京:国防工业出版社,1995.88-90.
[2] 金忠青,周志芳.工程水力学反问题[M ].南京:河海大学出版社,1997.29-30.
[3] 朱伯芳,贾金生,饶斌.拱坝体型优化的数学模型[J].水利学报,1992,(3):1-6.
[4] 黎展眉.拱坝设计[M ].北京:水利电力出版社,1982.126-133.
[5] 厉易生.二次曲线拱坝及其工程优化模型[J].水利学报,1988,(7):27-31.
王德信等.高地震区高拱坝合理体型的研究.河海大学,1999年
[2] 金忠青,周志芳.工程水力学反问题[M ].南京:河海大学出版社,1997.29-30.
[3] 朱伯芳,贾金生,饶斌.拱坝体型优化的数学模型[J].水利学报,1992,(3):1-6.
[4] 黎展眉.拱坝设计[M ].北京:水利电力出版社,1982.126-133.
[5] 厉易生.二次曲线拱坝及其工程优化模型[J].水利学报,1988,(7):27-31.
王德信等.高地震区高拱坝合理体型的研究.河海大学,1999年
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