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Publications in Math-Net.Ru |
Citations |
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2023 |
| 1. |
E. V. Zubei, A. A. Trofimuk, “On the $p$-length of a finite factorizable group with given permutability conditions for subgroups of factors”, PFMT, 2023, no. 3(56), 44–47  |
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2022 |
| 2. |
E. V. Zubei, “Finite groups with weakly subnormal Schmidt subgroups in some maximal subgroups”, PFMT, 2022, no. 3(52), 82–85 |
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2021 |
| 3. |
E. V. Zubei, “Finite groups with $OS$-propermutable subgroups”, Chebyshevskii Sb., 22:3 (2021), 457–463 |
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2019 |
| 4. |
E. V. Zubei, “On the permutability of Sylow subgroups with derived subgroups of $B$-subgroups”, Journal of the Belarusian State University. Mathematics and Informatics, 1 (2019), 12–17 |
| 5. |
V. S. Monakhov, A. A. Trofimuk, E. V. Zubei, “Finite groups with restrictions on two maximal subgroups”, PFMT, 2019, no. 3(40), 88–92 |
| 6. |
A. A. Trofimuk, E. V. Zubei, “On the permutability of a Sylow subgroup with Schmidt subgroups of odd order”, PFMT, 2019, no. 1(38), 69–71 |
| 7. |
E. V. Zubei, “On the solvability of a finite group with seminormal or subnormal Schmidt subgroups of one of its maximal subgroups”, Trudy Inst. Mat. i Mekh. UrO RAN, 25:1 (2019), 55–61  |
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2018 |
| 8. |
V. S. Monakhov, E. V. Zubei, “On composition factors of a finite group with $OS$-seminormal Sylow subgroup”, Tr. Inst. Mat., 26:1 (2018), 88–94 |
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| 9. |
V. S. Monakhov, E. V. Zubei, “On the permutability of a Sylow subgroup with Schmidt subgroups from a supplement”, Trudy Inst. Mat. i Mekh. UrO RAN, 24:3 (2018), 145–154 |
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2017 |
| 10. |
E. V. Zubei, “On finite groups with Schmidt subgroups of rank 4”, PFMT, 2017, no. 3(32), 48–51 |
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