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Publications in Math-Net.Ru |
Citations |
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2024 |
| 1. |
D. V. Gritsuk, A. A. Trofimuk, “On some product of $\mathrm{SM}$-groups”, Chebyshevskii Sb., 25:1 (2024), 170–175  |
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2014 |
| 2. |
D. V. Gritsuk, “Dependence of the derived $p$-length of a $p$-solvable group on the order of its Sylow $p$-subgroup”, PFMT, 2014, no. 3(20), 58–60 |
| 3. |
D. V. Gritsuk, “Derived $\pi$-length of a $\pi$-solvable group in which the Sylow $p$-subgroups are either bicyclic or of order $p^3$”, PFMT, 2014, no. 2(19), 54–58 |
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2013 |
| 4. |
V. S. Monakhov, D. V. Gritsuk, “On derived $\pi$-length of a finite $\pi$-solvable group with supersolvable $\pi$-Hall subgroup”, Algebra Discrete Math., 16:2 (2013), 233–241  |
| 5. |
D. V. Gritsuk, V. S. Monakhov, O. A. Shpyrko, “On finite $\pi$-solvable groups with bicyclic Sylow subgroups”, PFMT, 2013, no. 1(14), 61–66 |
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| 6. |
V. S. Monakhov, D. V. Gritsuk, “On the derived $\pi$-length of a finite $\pi$-solvable group with a given $\pi$-Hall subgroup”, Trudy Inst. Mat. i Mekh. UrO RAN, 19:3 (2013), 215–223  |
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2012 |
| 7. |
D. V. Gritsuk, V. S. Monakhov, “On maximal subgroup of a finite solvable group”, Eurasian Math. J., 3:2 (2012), 129–134  |
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| 8. |
D. V. Gritsuk, V. S. Monakhov, “On solvable groups whose Sylow subgroups are either abelian or extraspecial”, Tr. Inst. Mat., 20:2 (2012), 3–9 |
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