Университеттің 85 жылдығына арналған «Қазіргі заманғы математика:
проблемалары және қолданыстары» III халықаралық Тайманов оқуларының
материалдар жинағы, 25 қараша, 2022 жыл
392
2.
Lusztig G. Monodromic Systems on affine flag manifolds // Proceedings of the Royal
Society of London. Series. A. – 1994. – V. 445. – P. 231 – 246.
3.
AndersenH.H.,JantzenJ.C., Soergel W. Representation of quantum groups at a p-th root
of unity and of semisimple groups in characteristic p: independence of p. Astérisque, 1994. – V.
220. – 321 P.
4.
Kashivara M., Tanisaki T. Kazhdan-Lusztig conjecture for
affine Lie algebras with
negative level // Duke Mathematical Journal. – 1995. – V. 77. – P. 21 – 62.
5.
Kashivara M., Tanisaki T. Kazhdan-Lusztig conjecture for affine Lie algebras with
negative level II. Nonintegralcase // DukeMathematicalJournal. – 1996. – V. 84. – P. 771 – 813.
6.
Kazhdan D., Lusztig G. Tensor structures arising from affine Lie algebras: I, II //
Journal of American Mathematical Society. – 1993. – V. 6. – P. 905 – 947, 949 - 1011.
7.
Kazhdan D., Lusztig G. Tensor structures arising from affine Lie algebras: III, IV //
Journal of American Mathematical Society. – 1994. – V. 7. – P. 335 – 381, 383 - 453.
8.
Bezrukavnikov R., Mirkovič I., Rumynin D. Localization of modules for a semisimple
Lie algebra in prime characteristic // MathematischeAnnalen. –2008. – V. 167. – P. 945 – 991.
9.
Fiebig P. Sheaves on affine Schubert varieties, modular representations and Lusztig’s
conjecture // Journal of American Mathematical Society. – 2011. – V. 24. – P. 133 – 181.
10.
Fiebig P. An upper bound on the exceptional characteristics for Lusztig’s character
formulae // Journal of American Mathematical Society. – 2011. – V. 24. – P. 133 – 181.
11.
Williamson G. On torsion in the intersection cohomology of Schubert varieties //
Journal of Algebra. – 2017. –V. 475. – P. 207 – 228.
12.
Williamson G. Schubert calculus and torsion explosion // Journal of American
Mathematical Society. – 2017. – V. 30. – P. 1023 – 1046.
13.
Рудаков А.Н., Шафаревич И.Р. Неприводимые
представления простой
трехмерной алгебры Ли над полем конечной характеристики // Математические заметки. –
1967. – Т.2, №5. – С. 439 – 454.
14.
Braden B. Restricted representations of classical Lie algebras of types
𝐴
2
and
𝐵
2
//
Bulletin of the American Mathematical Society. – 1967. – Vol. 73, No 3. – P. 482 – 486.
15.
Рудаков А.Н. Размерности некоторых неприводимых представлений
полупростых алгебр Ли классического типа над полями конечной характеристики ..
ТрудысеминараИ.Г. Петровского. – 1978. – №3. – С. 147 – 160.
16.
Hochschild G. Cohomology of restricted Lie algebras // American Journal of
Mathematics. – 1954. – V. 76. – P. 555 – 580.
17.
Friedlander E.M., Parshall B.J. Cohomology of Lie algebras and algebraic groups //
American Journal of Mathematics. – 1986. – V. 108. – P. 235 – 253.
18.
Andersen H.H., Jantzen J.C. Cohomology of induced representations for algebraic
groups // MathematischeAnnalen. – 1984. – V. 269. – P. 487 – 524.
19.
Jantzen J.C. First cohomology groups for classical Lie algebras //
Progress in
Mathematics. – 1991. – V. 95. – P. 289 – 315.
20.
Ибраев Ш.Ш. Нерасщепляемые расширения и когомологии модулярных
классических алгебр Ли классического типа. Диссерт. насоиск. уч. ст. к.ф.-м.н., Алматы,
2001, 119 С.
21.
Bendel C.P. Nakano D.K., Pillen C. Second cohomology groups for Frobenius kernel
and related structures // Advances in Mathematics. – 2007. – V. 209. – P. 162 – 197.
22.
Bendel C.P. Nakano D.K., Pillen C. Third cohomology groups for Frobenius kernel
and related structures. In:
Lie algebras, Lie superalgebras, Vertex algebras, Related Topics.
Proceedings of Symposia in Pure Mathematics. – 2016. – P. 81 – 118.
23.
Chevalley C., Eilenberg S. Cohomology theory of Lie groups and Lie algebras //
Transactions of the American Mathematical Society. – 1948. – V. 63. – P. 85 – 124.