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Article information
2020 , Volume 25, ¹ 1, p.49-65
Liseikin V.D., Karasuljic S.
Numerical analysis of grid-clustering rules for problems with power of the first type boundary layers
This paper demonstrates results of numerical experiments on some popular and new layer-resolving grids applied for solving one-dimensional singularly-perturbed problems having power of the first type boundary layers.
[full text]
Keywords: singularly perturbed equations, small parameter, boundary and interior layers, grid generation
doi: 10.25743/ICT.2020.25.1.004
Author(s):
Liseikin Vladimir Dmitrievich
Dr. , Professor
Position: Leading research officer
Office: Federal Research Center for Information and Computational Technologies
Address: 630090, Russia, Novosibirsk, pr. Lavrentjeva, 6
Phone Office: (383) 330 73 73
E-mail: lvd@ict.nsc.ru
SPIN-code: 5198Karasuljic Samir
Dr. , Associate Professor
Position: Associate Professor
Office: University of Tuzla
Address: 75000, Bosnia and herzegovina, Tuzla, Univerzitetska br.4
Phone Office: (387) 35 320 902
E-mail: samir.karasuljic@gmail.com
References:
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[9] Liseikin V.D. On the numerical solution of singularly perturbed equations with a turning point. J. Comput. Maths. Math. Phys. 1984; 24(6):135–139.
[10] Liseikin V.D. Grid generation for problems with boundary and interior layers. Novosibirsk: NGU; 2018: 296. (In Russ.)
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[12] Liseikin V.D. Layer resolving grids and transformations for singular perturbation problems. Utrecht: VSP; 2001: 284.
[13] Becher S. FEM-analysis on graded meshes for turning point problems exhibiting an interior layer. 2016:1–17. Available at: https://arxiv.org/abs/1603.04653
[14] Liseikin V.D., Paasonen V.I. Compact difference schemes and layer-resolving grids for numerical modeling of problems with boundary and interior layers. Numerical Analysis and Applications. 2019; 12(1):1–17.
Bibliography link:
Liseikin V.D., Karasuljic S. Numerical analysis of grid-clustering rules for problems with power of the first type boundary layers // Computational technologies. 2020. V. 25. ¹ 1. P. 49-65
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