The Galerkin finite element method is applied to obtain simultaneous solutions in the space domain to the governing equations where the displacements and the fluid pressures are the primary unknowns.
利用有限元方法得到了控制方程中未知的位移和流体压力在几何域上的耦合解。
By supposing the displacement shape functions and applying the Galerkin method, the dynamical equations with respect to time were gained.
通过位移形函数假设,采用伽辽金积分方法得到了时间变率的动力学控制方程;
The finite element equation of 3d3c CSAMT electric field is derived from Maxwell equations using Galerkin method.
首先从麦克斯韦方程出发,用伽里金方法推导了三维三分量CSAMT法的有限元方程。
The governing equations are discredited by using Galerkin method, and the matrix for elastoplastic constitutive model is also deduced.
采用加权残值法对耦合方程组进行有限元离散,并推导相应的弹塑性矩阵。
The governing equations are discredited by using Galerkin method, and the matrix for elastoplastic constitutive model is also deduced.
采用加权残值法对耦合方程组进行有限元离散,并推导相应的弹塑性矩阵。
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