论文信息 - Yamamoto's principle and its applications to precise finite element error analysis

Yamamoto's principle and its applications to precise finite element error analysis

Suppose that we discretize an elliptic boundary value problem and obtain a linear equation Ax = f. In many case, the inverse matrix A-1 is closely related to the Green function of the original boundary value problem. This fact is called Yamamoto's principle. In this paper, using Yamamoto's principle, we develop a precise error analysis of the piecewise linear finite element method for two-point boundary value problems with discontinuous and not necessarily positive coefficient functions. We show that precise error estimations, similar to known error bounds, are obtained even in this case.

Takuya Tsuchiya | Kazuki Yoshida | Sae Ishioka

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