Article ID Journal Published Year Pages File Type
9662283 Computers & Mathematics with Applications 2005 22 Pages PDF
Abstract
The a posteriori error evaluation based on differential approximation of a finite-difference scheme and adjoint equations is addressed. The differential approximation is composed of primal equations and a local truncation error determined by a Taylor series in Lagrange form. This approach provides the feasibility of both refining the solution and using the Holder inequality for asymptotic bounding of the remaining error.
Related Topics
Physical Sciences and Engineering Computer Science Computer Science (General)
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