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伪双曲方程的新混合有限元方法
引用本文:刘洋,李宏. 伪双曲方程的新混合有限元方法[J]. 应用数学, 2010, 23(1)
作者姓名:刘洋  李宏
作者单位:内蒙古大学数学科学学院,内蒙古,呼和浩特,010021
基金项目:the National Natural Science Fund,NSF of Inner Mongolia Autonomous Region,513 Fund and Youth Science Fund 
摘    要:构造分析一类二阶伪双曲方程的H1-Galerkin扩展混合有限元方法,该方法采用了扩展混合有限元方法和H1-Galerkin混合有限元方法相结合的技巧.新的格式同时保持了扩展混合有限元方法和H1-Galerkin混合有限元方法的优点.该混合格式与标准的混合格式相比能同时逼近三个变量:未知函数、梯度和流量(系数乘以梯度),并且不必满足LBB相容性条件.

关 键 词:伪双曲方程  H1-Galerkin扩展混合有限元方法  半离散和全离散格式  误差估计

A New Mixed Finite Element Method for Pseudo-Hyperbolic Equation
LIU Yang,LI Hong. A New Mixed Finite Element Method for Pseudo-Hyperbolic Equation[J]. Mathematica Applicata, 2010, 23(1)
Authors:LIU Yang  LI Hong
Abstract:An H1 - Galerkin expanded mixed finite element method which combines expanded mixed finite element and H1 - Galerkin mixed finite element method is constructed and analyzed for a class of second order pseudo-hyperbolic equations. The new formulation not only keeps the advantages of expanded mixed formulation but also keeps the advantages of H1- Galerkin mixed formulation. The new mixed formulation expands the standard mixed formulation in the sense that three variables are explicitly treated:the scalar unknown, its gradient and its flux (coefficient times the gradient), what 's more,the proposed approach does not require LBB consistency condition.
Keywords:Pseudo-hyperbolic equations  H1- Galerkin expanded mixed finite element method  Semidiscrete and fully discrete schemes  Error estimates
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