In this work we address the analysis of the stationary generalized Burgers-Huxley equation (a nonlinear elliptic problem with anomalous advection) and propose conforming, nonconforming and discontinuous Galerkin finite element methods for its numerical approximation. The existence, uniqueness and regularity of weak solutions is discussed in detail using a Faedo-Galerkin approach and fixed-point theory, and a priori error estimates for all three types of numerical schemes are rigorously derived. A set of computational results are presented to show the efficacy of the proposed methods.
翻译:在这项工作中,我们处理对固定式普遍汉堡-Huxley等式(非线性省略法异常消化问题)的分析,并就其数字近似值提出符合、不符合和不连续的Galerkin有限要素方法,采用Faedo-Galerkin方法和固定点理论详细讨论薄弱解决方案的存在、独特性和规律性,严格估算所有三类数字方法的先验误差估计数,提出一套计算结果,以显示拟议方法的有效性。
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