拉普拉斯变换
粘弹性
流离失所(心理学)
边值问题
压力(语言学)
幂级数
数学分析
数学
解析元法
机械
流变学
边界(拓扑)
拉普拉斯方程
解析函数
变量分离
系列(地层学)
幂函数
洛朗级数
对应原理(社会学)
拉普拉斯逆变换
压力系数
反问题
孔隙水压力
内压
扩展系列
流函数
数值分析
反向
功能(生物学)
几何学
岩土工程
半无限
梅林变换
作者
Hongliang Liu,Xin Gao,Hui Cai,Yu Chen,Hongyun Fan
摘要
ABSTRACT Based on the complex variable method and the corresponding principle of viscoelasticity, viscoelastic solutions for the stress and displacement of a lined non‐circular tunnel subjected to in‐situ stresses and internal water pressure is derived. The basic equations for solving the analytic functions are established according to the stress boundary condition along the inner boundary of the lining and the stress and displacement continuity conditions along the rock‐lining interface. The analytic functions are expressed as Laurent series and the Laplace transformation is performed on the basic equation. Herein, the power series method is applied to obtain the linear equations which are expressed by the analytic function coefficients in the Laplace domain. The stress and displacement solutions of tunnel in Laplace domain can be addressed by solving the equations, and then the viscoelastic solutions are obtained through Laplace Inverse transformation. Subsequently, an example for the horseshoe‐shaped tunnel is performed. The example used the generalized Kelvin model to simulate the rheological properties of surrounding rock mass. The obtained solution is compared with the numerical solution. The influences of the lateral pressure coefficient and the internal water pressure on the stresses and displacements of lining are analyzed.
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