Решетихин Николай Юрьевич
Недавние публикации
- Christian Blanchet, Nathan Geer, Bertrand Patureau-Mirand, Nicolai Reshetikhin,
"Holonomy braidings, biquandles and quantum invariants of links with SL2(?) flat connections",
arXiv:1806.02787
- Olga Postnova, Nicolai Reshetikhin,
"On multiplicities of irreducibles in large tensor product of representations of simple Lie algebras",
arXiv:1812.11236
- Nicolai Reshetikhin, Gus Schrader,
"Superintegrability of Generalized Toda Models on Symmetric Spaces",
arXiv:1802.00356 (accepted in IMRN).
- Nicolai Reshetikhin,
"Semiclassical geometry of integrable systems",
J. Phys. A: Math. and Theor. 51, No. 16, 2018.
- Alberto S. Cattaneo, Pavel Mnev, Nicolai Reshetikhin,
"Poisson sigma model and semiclassical quantization of integrable systems",
Reviews in Mathematical Physics 30, No. 06, (2018)
- N. Reshetikhin,
"Degenerate integrability of quantum spin Calogero-Moser systems",
Letters in Mathematical Physics 107, 187 (2017).
- N. Reshetikhin, J. Stokman and B. Vlaar,
"Boundary Quantum Knizhnik-Zamolodchikov Equations and Fusion",
Annales Henri Poincare 17, 137 (2016).
- N. Reshetikhin and B. Vertman,
"Combinatorial Quantum Field Theory and Gluing Formula for Determinants",
Letters in Mathematical Physics 105, 309 (2015).
- A. S. Cattaneo, P. Mnev, and N. Reshetikhin,
"Classical BV Theories on Manifolds with Boundary",
Communications in Mathematical Physics 332, 535 (2014).
Избранные публикации
- A. Okounkov and N. Reshetikhin,
"Random skew plane partitions and the Pearcey process",
Comm. Math. Phys. 269, 571 (2007).
- D. Cimasoni and N. Reshetikhin
"Dimers on surface graphs and spin structures",
I. Comm. Math. Phys. 275, 187 (2007);
II. Comm. Math. Phys. 281, 445 (2008).
- I.B. Frenkel and N.Yu. Reshetikhin,
"Quantum affine algebras and holonomic difference equations",
Comm. Math. Phys. 146, 1 (1992).
- N. Reshetikhin and V.G. Turaev,
"Invariants of 3-manifolds via link polynomials and quantum groups",
Invent. Math. 103, 547 (1991).
- L.D. Faddeev and N.Yu. Reshetikhin,
"Integrability of the principal chiral field model in 1+1 dimension",
Ann. Physics 167, 227 (1986).