Adjoint Correction and Bounding of Error Using Largange Form of Truncation Term
نویسندگان
چکیده
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 Largange form. This approach provides the feasibility of both refining the solution and using the Holder inequality for asymptotic bounding of the remaining error.
منابع مشابه
Adjoint Correction and Bounding of Error Using Lagrange Form of Truncation Term
The a posteriori error evaluation based on differential approximation of a finitedifference 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 boundi...
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