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Correction to: Japan Journal of Industrial and Applied Mathematics (2021) 38:163–191 https://doi.org/10.1007/s13160-020-00433-z
This article is a correction to our previous paper [1]. The geometric parameters \(\alpha _{\max }\) and \(\alpha _{\min }\), which represent the maximum and minimum edge lengths of the simplex under consideration, play a significant role in [1]. Theorems 2 and 3 claim that the interpolation errors can be estimated without the ratio \(\alpha _{\max }/\alpha _{\min }\). Unfortunately, the proofs of Theorems 2 and 3 contain some mistakes. The ratio \(\alpha _{\max }/\alpha _{\min }\) cannot be removed from by the technique proposed in [1].
As a correction to Theorem 2, Theorems A and B are given in [3]. Theorem A presents an error estimate with the ratio \(\alpha _{\max }/\alpha _{\min }\) under the assumptions of Theorem 2 in [1]. Theorem B presents an error estimate without the ratio \(\alpha _{\max }/\alpha _{\min }\) under stronger assumptions than in Theorem 2.
References
Ishizaka, H., Kobayashi, K., Tsuchiya, T.: General theory of interpolation error estimates on anisotropic meshes. Jpn. J. Ind. Appl. Math. 38(1), 163–191 (2021)
Ishizaka, H.: Anisotropic Raviart–Thomas interpolation error estimates using a new geometric parameter. Calcolo 59(4), 50 (2022)
Ishizaka, H., Kobayashi, K., Tsuchiya, T.: Anisotropic interpolation error estimates using a new geometric parameter. Jpn. J. Ind. Appl. Math. 40(1), 475–512 (2022)
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Ishizaka, H., Kobayashi, K. & Tsuchiya, T. Correction to: General theory of interpolation error estimates on anisotropic meshes. Japan J. Indust. Appl. Math. 40, 1355–1356 (2023). https://doi.org/10.1007/s13160-023-00582-x
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DOI: https://doi.org/10.1007/s13160-023-00582-x