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Publications in Math-Net.Ru |
Citations |
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2023 |
| 1. |
T. A. Pushkova, A. M. Sebel'din, “On the Question of the Definability of Certain Classes of Completely Decomposable Abelian Torsion-Free Groups by Their Homomorphism Groups”, Mat. Zametki, 113:5 (2023), 738–741   ; Math. Notes, 113:5 (2023), 700–703  |
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2020 |
| 2. |
T. A. Pushkova, A. M. Sebel'din, “On the Question of Definability of Homogeneously Decomposable Torsion-Free Abelian Groups by Their Homomorphism Groups and Endomorphism Rings”, Mat. Zametki, 108:1 (2020), 130–136  ; Math. Notes, 108:1 (2020), 117–122  |
| 3. |
E. M. Kolenova, T. A. Pushkova, “Abelian RE-Groups”, Mat. Zametki, 107:4 (2020), 533–538 ; Math. Notes, 107:4 (2020), 595–599 |
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2019 |
| 4. |
T. A. Pushkova, “Definability of completely decomposable torsion-free
Abelian groups by semigroups of endomorphism and groups of homomorphisms”, Fundam. Prikl. Mat., 22:5 (2019), 145–152 ; J. Math. Sci., 259:4 (2021), 484–489 |
| 5. |
T. A. Pushkova, A. M. Sebel'din, “Definability of Completely Decomposable Torsion-Free Abelian Groups by Endomorphism Semigroups and Homomorphism Groups”, Mat. Zametki, 105:3 (2019), 421–427 ; Math. Notes, 105:3 (2019), 398–403 |
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2017 |
| 6. |
T. A. Pushkova, A. M. Sebel'din, “On the Definability of Completely Decomposable Torsion-Free Abelian Groups by Endomorphism Rings and Some Groups of Homomorphisms”, Mat. Zametki, 101:4 (2017), 576–581 ; Math. Notes, 101:4 (2017), 688–692 |
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