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Publications in Math-Net.Ru
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The Jordan block structure of the images of unipotent elements in irreducible modular representations of classical algebraic groups of small dimensions
Sib. Èlektron. Mat. Izv., 20:1 (2023), 306–454
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Special factors in the restrictions of irreducible modules of classical groups to subsystem subgroups with two simple components
Trudy Inst. Mat. i Mekh. UrO RAN, 29:4 (2023), 259–273
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On the behaviour of unipotent elements from subsystem subgroups of small ranks in irreducible representations of the classical algebraic groups in positive characteristic
Tr. Inst. Mat., 30:1-2 (2022), 117–129
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On finite 4-primary groups having a disconnected Gruenberg-Kegel graph and a composition factor isomorphic to $L_3(17)$ or $Sp_4(4)$
Trudy Inst. Mat. i Mekh. UrO RAN, 28:1 (2022), 139–155
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Блочная структура образов регулярных унипотентных элементов из подсистемных симплектических подгрупп ранга 2 в неприводимых представлениях симплектических групп. III
Mat. Tr., 23:2 (2020), 70–99
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Блочная структура образов регулярных унипотентных элементов из подсистемных симплектических подгрупп ранга $2$ в неприводимых представлениях симплектических групп. II
Mat. Tr., 23:1 (2020), 37–106
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On the properties of irreducible representations of special linear and symplectic groups that are not large with respect to the field characteristic and regular unipotent elements from subsystem subgroups
Trudy Inst. Mat. i Mekh. UrO RAN, 26:2 (2020), 88–97
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The block structure of the images of regular unipotent elements from subsystem symplectic subgroups of rank $2$ in irreducible representations of symplectic groups. I
Mat. Tr., 22:1 (2019), 68–100
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V. I . Yanchevskii is 70
Algebra Discrete Math., 26:1 (2018), C–F
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Special composition factors in restrictions of representations of special linear andsymplectic groups to subsystem subgroups with two simple components
Tr. Inst. Mat., 26:1 (2018), 113–133
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Big composition factors in restrictions of representations of the special linear group to subsystem subgroups with two simple components
Tr. Inst. Mat., 23:2 (2015), 123–136
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Inductive systems of representations with small highest weights for natural embeddings of symplectic groups
Tr. Inst. Mat., 22:2 (2014), 109–118
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On the behavior of elements of prime order from a Zinger cycle in representations of a special linear group
Trudy Inst. Mat. i Mekh. UrO RAN, 19:3 (2013), 179–186
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Unipotent elements of nonprime order in representations of the classical algebraic groups: two big Jordan blocks
Zap. Nauchn. Sem. POMI, 414 (2013), 193–241
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On the block structure of regular unipotent elements from subsystem subgroups of type $A_1\times A_2$ in representations of the special linear group
Zap. Nauchn. Sem. POMI, 388 (2011), 247–269
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Representations of algebraic groups of type $C_n$ with small weight multiplicities
Zap. Nauchn. Sem. POMI, 375 (2010), 140–166
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Representations of algebraic groups of type $D_n$ in characteristic 2 with small weight multiplicities
Zap. Nauchn. Sem. POMI, 365 (2009), 182–195
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The group generated by round permutations of the cryptosystem BelT
Tr. Inst. Mat., 15:1 (2007), 15–21
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On the behaviour of small quadratic elements in representations of the special linear group with large highest weights
Zap. Nauchn. Sem. POMI, 343 (2007), 84–120
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Minimal polynomials of elements of order $p$ in irreducible representations of Chevalley groups over fields of characteristic $p$
Trudy Inst. Mat. SO RAN, 30 (1996), 126–163
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Permutation representations and a fragment of the decomposition matrix of symplectic and special linear groups over a finite field
Sibirsk. Mat. Zh., 31:5 (1990), 46–60
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Truncated symmetric powers of natural realizations of the groups $SL_m(P)$ and $Sp_m(P)$ and their constraints on subgroups
Sibirsk. Mat. Zh., 31:4 (1990), 33–46
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Subgroups of $G(n,p)$ containing $SL(2,p)$ in an irreducible representation of degree $n$
Mat. Sb. (N.S.), 109(151):3(7) (1979), 453–468
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Member of the National Academy of Sciences of Belarus V.I. Yanchevskii. Towards the 70th birthday
Tr. Inst. Mat., 26:1 (2018), 6–8
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