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Publications in Math-Net.Ru |
Citations |
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2024 |
1. |
V. I. Paasonen, “Criteria of solvability of asymmetric difference schemes at high-precision approximation of boundary conditions”, Sib. Zh. Vychisl. Mat., 27:3 (2024), 335–347 |
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2023 |
2. |
S. B. Medvedev, O. V. Shtyrina, I. A. Vaseva, V. I. Paasonen, M. P. Fedoruk, “Numerical splitting schemes for solving the Ginzburg–Landau equation with saturated gain and cubic mode locked”, Kvantovaya Elektronika, 53:10 (2023), 807–812 [Bull. Lebedev Physics Institute, 50:suppl. 13 (2023), S1484–S1491] |
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2021 |
3. |
V. D. Liseikin, V. I. Paasonen, “Adaptive grids and high-order schemes for solving singularly-perturbed problems”, Sib. Zh. Vychisl. Mat., 24:1 (2021), 77–92 ; Num. Anal. Appl., 14:1 (2021), 69–82 |
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2020 |
4. |
V. I. Paasonen, “Classification of difference schemes of the maximum possible accuracy on extended symmetric stencils for the Schrödinger equation and the heat transfer equation”, Sib. Zh. Vychisl. Mat., 23:1 (2020), 99–114 ; Num. Anal. Appl., 13:1 (2020), 82–94 |
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2019 |
5. |
V. D. Liseikin, V. I. Paasonen, “Compact difference schemes and layer-resolving grids for the numerical modeling of problems with boundary and interior layers”, Sib. Zh. Vychisl. Mat., 22:1 (2019), 41–56 ; Num. Anal. Appl., 12:1 (2019), 37–50 |
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2018 |
6. |
V. I. Paasonen, “The properties of difference schemes on oblique stencils for the hyperbolic equations”, Sib. Zh. Vychisl. Mat., 21:1 (2018), 83–97 ; Num. Anal. Appl., 11:1 (2018), 60–72 |
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1999 |
7. |
V. I. Paasonen, “The improved boundary conditions at the singular points of coordinate systems for non-stationary boundary value problems”, Sib. Zh. Vychisl. Mat., 2:4 (1999), 373–384 |
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Organisations |
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