20 citations to https://www.mathnet.ru/rus/semr198
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Ugurlu P., “Pseudofinite Groups as Fixed Points in Simple Groups of Finite Morley Rank”, J. Pure Appl. Algebr., 217:5 (2013), 892–900
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Е. И. Тимошенко, “Квазимногообразия, порожденные частично коммутативными группами”, Сиб. матем. журн., 54:4 (2013), 902–913 ; E. I. Timoshenko, “Quasivarieties generated by partially commutative groups”, Siberian Math. J., 54:4 (2013), 722–730
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Casals-Ruiz M., Kazachkov I., On systems of equations over free partially commutative groups, Mem. Amer. Math. Soc., 212, no. 999, 2011
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Casals-Ruiz M., Kazachkov I.V., “Elements of algebraic geometry and the positive theory of partially commutative groups”, Canad. J. Math., 62:3 (2010), 481–519
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Ч. К. Гупта, Е. И. Тимошенко, “Частично коммутативные метабелевы группы: централизаторы и элементарная эквивалентность”, Алгебра и логика, 48:3 (2009), 309–341 ; Ch. K. Gupta, E. I. Timoshenko, “Partially commutative metabelian groups: centralizers and elementary equivalence”, Algebra and Logic, 48:3 (2009), 173–192
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Kambites M., “On commuting elements and embeddings of graph groups and monoids”, Proc. Edinb. Math. Soc. (2), 52:1 (2009), 155–170
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Khukhro E.I., “On solubility of groups with bounded centralizer chains”, Glasg. Math. J., 51:1 (2009), 49–54
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A. J. Duncan, I. V. Kazachkov, V. N. Remeslennikov, “Orthogonal systems in finite graphs”, Сиб. электрон. матем. изв., 5 (2008), 151–176
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Vaes S., “Explicit computations of all finite index bimodules for a family of II$_1$ factors”, Ann. Sci. Éc. Norm. Supér. (4), 41:5 (2008), 743–788
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Blatherwick V.A., “Centraliser dimension of free partially commutative nilpotent groups of class 2”, Glasg. Math. J., 50:2 (2008), 251–269