D. V. Artamonov, “A Gelfand–Tsetlin type basis for the algebra $\mathfrak g_2$”, Algebra i Analiz, 37:1 (2025), 1–31
2.
D. V. Artamonov, “Calculation of $6j$-symbols for the Lie algebra $\mathfrak{gl}_n$”, Sibirsk. Mat. Zh., 66:4 (2025), 551–569; Siberian Math. J., 66:4 (2025), 875–890
2024
3.
D. V. Artamonov, “Models of representations for classical series of Lie algebras”, Izv. RAN. Ser. Mat., 88:5 (2024), 3–46; Izv. Math., 88:5 (2024), 815–855
D. V. Artamonov, “Classical $6j$-symbols of finite-dimensional representations of the algebra $\mathfrak{gl}_3$”, TMF, 216:1 (2023), 3–19; Theoret. and Math. Phys., 216:1 (2023), 909–923
D. V. Artamonov, “Formulas for calculating the $3j$-symbols of the representations of the Lie algebra $\mathfrak{gl}_3$ for the Gelfand–Tsetlin bases”, Sibirsk. Mat. Zh., 63:4 (2022), 717–735; Siberian Math. J., 63:4 (2022), 595–610
D. V. Artamonov, “Functional approach to a Gelfand–Tsetlin-type basis for $\mathfrak{o}_5$”, TMF, 211:1 (2022), 3–22; Theoret. and Math. Phys., 211:1 (2022), 443–459
D. V. Artamonov, “The Clebsh–Gordan coefficients for the algebra $\mathfrak{gl}_3$ and hypergeometric functions”, Algebra i Analiz, 33:1 (2021), 1–29; St. Petersburg Math. J., 33:1 (2022), 1–22
D. V. Artamonov, “A Gelfand–Tsetlin-type basis for the algebra $\mathfrak{sp}_4$ and
hypergeometric functions”, TMF, 206:3 (2021), 279–294; Theoret. and Math. Phys., 206:3 (2021), 243–257
D. V. Artamonov, “The Stokes phenomenon for an irregular Gelfand-Kapranov-Zelevinsky system associated with a rank one lattice”, Mat. Sb., 207:8 (2016), 3–30; Sb. Math., 207:8 (2016), 1037–1063
2015
11.
D. V. Artamonov, V. A. Golubeva, “Central Elements of the Universal Enveloping Algebra and Functions of Matrix Elements”, Mat. Zametki, 98:3 (2015), 323–336; Math. Notes, 98:3 (2015), 357–366
D. V. Artamonov, V. A. Golubeva, “$W$-algebras and higher analogues of the Knizhnik–Zamolodchikov equations”, TMF, 182:3 (2015), 355–372; Theoret. and Math. Phys., 182:3 (2015), 313–328
D. V. Artamonov, V. A. Golubeva, “Non-commutative Pfaffians”, Uspekhi Mat. Nauk, 67:1(403) (2012), 179–180; Russian Math. Surveys, 67:1 (2012), 175–177
14.
D. V. Artamonov, V. A. Golubeva, “Noncommutative Pfaffians associated with the orthogonal algebra”, Mat. Sb., 203:12 (2012), 5–34; Sb. Math., 203:12 (2012), 1685–1714
D. V. Artamonov, “The Schlesinger system and isomonodromic deformations of bundles with connections on Riemann surfaces”, TMF, 171:3 (2012), 370–386; Theoret. and Math. Phys., 171:3 (2012), 739–753
D. V. Artamonov, “The Number of Additional Singular Points in the Riemann–Hilbert Problem on a Riemann Surface”, Mat. Zametki, 90:1 (2011), 3–10; Math. Notes, 90:1 (2011), 3–9
Базис Гельфанда-Капранова-Зелевинского D. V. Artamonov VIII Workshop and Conference on Lie Algebras, Algebraic Groups, and Invariant Theory January 30, 2020 17:00
Multidimensional Stokes phenomenon D. V. Artamonov International Conference on Differential Equations and Dynamical Systems July 7, 2014 12:20
39.
$W$-алгебры и высшие аналоги уравнения Книжника-Замолодчикова D. V. Artamonov Seminar of the Department of Geometry and Topology of the Steklov Mathematical Institute, RAS,
and the Department of Geometry and Topology of the Faculty of Mechanics and Mathematics, MSU
"Geometry, Topology and Mathematical Physics" (Novikov Seminar) March 26, 2014 18:30
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