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Publications in Math-Net.Ru
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Finite groups whose prime graphs do not contain triangles. III
Sibirsk. Mat. Zh., 64:1 (2023), 65–71
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On Finite Simple Groups of Exceptional Lie Type over Fields of Different Characteristics with Coinciding Prime Graphs
Trudy Inst. Mat. i Mekh. UrO RAN, 26:2 (2020), 147–160
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On finite simple linear and unitary groups of small size over fields of different characteristics with coinciding prime graphs
Trudy Inst. Mat. i Mekh. UrO RAN, 24:3 (2018), 73–90
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On finite simple linear and unitary groups over fields of different characteristics with coinciding prime graphs. I
Trudy Inst. Mat. i Mekh. UrO RAN, 23:4 (2017), 136–151
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On finite simple classical groups over fields of different characteristics with coinciding prime graphs
Trudy Inst. Mat. i Mekh. UrO RAN, 22:3 (2016), 101–116
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Finite almost simple groups with prime graphs all of whose connected components are cliques
Trudy Inst. Mat. i Mekh. UrO RAN, 21:3 (2015), 132–141
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Finite simple groups of Lie type over a field of the same characteristic with the same prime graph
Trudy Inst. Mat. i Mekh. UrO RAN, 20:2 (2014), 168–183
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On finite groups with disconnected prime graph
Trudy Inst. Mat. i Mekh. UrO RAN, 18:3 (2012), 99–105
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Recognizability by spectrum of simple groups $C_p(2)$
Trudy Inst. Mat. i Mekh. UrO RAN, 17:4 (2011), 102–113
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Recognition of simple groups $B_p(3)$ by the set of element orders
Sibirsk. Mat. Zh., 51:2 (2010), 303–315
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Recognizability by spectrum of simple groups $C_p(3)$
Trudy Inst. Mat. i Mekh. UrO RAN, 16:3 (2010), 88–95
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An example of a double Frobenius group with order components as in the simple group $S_4(3)$
Vladikavkaz. Mat. Zh., 10:1 (2008), 35–36
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On Finite Simple Groups with the Set of Element Orders as in a Frobenius Group or a Double Frobenius Group
Mat. Zametki, 73:3 (2003), 323–339
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On composition factors of finite groups having the same set of element orders as the group $U_3(q)$
Sibirsk. Mat. Zh., 43:2 (2002), 249–267
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