рус Talks
30. [pdf] Differential substitutions for non-Abelian equations of KdV type. (in Russian)
V.E. Adler. 17 December 2021, ITP.
29. [pdf] Some results on Painlevé-type equations of orders 4 and 5 (Digest of Cosgrove works). (in Russian)
V.E. Adler. 15 September 2021, seminar of the sector of mathematical physics.
28. [pdf] On matrix Painlevé II equations. (in Russian)
V.E. Adler, V.V. Sokolov. 2 March 2021, Ufa Inst. Math.; 26 March 2021, ITP.
27. [pdf] Stationary solutions of non-autonomous symmetries of integrable equations.
V.E. Adler. 28 November 2020. Integrable Days 65th birthday celebration for A.P. Veselov.
26. [pdf] Painlevé-type reductions for the non-Abelian Volterra lattices.
V.E. Adler. 30 October 2020, ITP, Chernogolovka.
25. [pdf] Integrable 7-point discrete equations and evolution lattice equations of order 2. (in Russian)
V.E. Adler. 10 April 2020, ITP, Chernogolovka.
24. [pdf] Nonautonomous symmetries of the KdV equation and step-like solutions. (in Russian)
V.E. Adler. 15 November 2019, ITP, Chernogolovka.
23. [pdf] Some exact solutions of the Volterra lattice.
V.E. Adler, A.B. Shabat. 19 April 2019, ITP, Chernogolovka.
22. [pdf] Volterra chain and Catalan numbers. (in Russian)
V.E. Adler, A.B. Shabat. 21 December 2018, ITP, Chernogolovka.
21. [pdf] Integrable Möbius invariant evolutionary lattices of second order. (in Russian)
V.E. Adler. 22 June 2016. Landau days, 20-22 June 2016, ITP, Chernogolovka.
20. [pdf] On the combinatorics of several integrable hierarchies.
V.E. Adler. 17 February 2015, MCCME.
19. [pdf] On the combinatorics of several integrable hierarchies. (in Russian)
V.E. Adler. 23 January 2015, seminar of the sector of mathematical physics.
18. [pdf]
[nb]
Integrability test for evolutionary lattice equations of higher order. (in Russian)
V.E. Adler. 5 September 2014, seminar of the sector of mathematical physics.
17. [pdf] Variational formulation of the multidimensional consistency for the discrete Laplace equations. (in Russian)
V.E. Adler, A.I. Bobenko, Yu.B. Suris. 25 June 2013, ITP.
16. [pdf] Quantum tops as examples of commuting differential operators. (in Russian)
A.B. Shabat, V.E. Adler, V.G. Marikhin. 7 October 2011, ITP.
15. [pdf] On the discrete analogs of the Tzitzeica and the Sawada-Kotera equations.
V.E. Adler. Petrovsky-110 workshop, Moscow State University, 30 May-4 June 2011.
14. [pdf] On the discrete analogs of the Tzitzeica equation. (in Russian)
V.E. Adler. 29 April 2011, ITP.
13. [pdf] Classiffication and geometry of the discrete integrable equations of Hirota type. (in Russian)
V.E. Adler. 30 December 2010. Geometry and integrable systems, MI RAS, 27-30 December 2010.
12. [pdf] The tangential map and associated integrable equations. (in Russian)
V.E. Adler. 14 October 2009, MSU.
11. [pdf] The tangential map and associated integrable equations.
V.E. Adler. 1 July 2009. CFT, Integrable Models and Liouville Gravity, 27 June - 2 July 2009, ITP, Chernogolovka.
10. [pdf] Classiffication of integrable equations of discrete KP type.
V.E. Adler, A.I. Bobenko, Yu.B. Suris. 23 June 2009. Landau days, 22-24 June 2009, ITP, Chernogolovka.
9. [pdf] Classification of discrete integrable equations of Hirota type.
V.E. Adler, A.I. Bobenko, Yu.B. Suris. GADUDIS, 30 March-03 April 2009, Glasgow.
8. [pdf] Multidimensional quadrilateral lattices with the values in Grassmann manifold are integrable.
V.E. Adler, A.I. Bobenko, Yu.B. Suris. Geometry and integrability, 13-20 December 2008, Obergurgl.
7. [pdf] On vector analogs of the Volterra lattice. (in Russian)
V.E. Adler, V.V. Postnikov. 23 May 2008, ITP.
6. [pdf] Discrete nonlinear hyperbolic equations. Classification of integrable cases.
V.E. Adler, A.I. Bobenko, Yu.B. Suris. DDG'07, 17 July 2007, Berlin.
5. [pdf] Dressing chain for the acoustic spectral problem. (in Russian)
V.E. Adler, A.B. Shabat. 14 April 2006, ITP.
4. [pdf] Some discrete integrable equations related to an elliptic curve.
V.E. Adler, Yu.B. Suris. 13 May 2005, Loughborough.
3. [pdf] Integrable discrete equations: some recent results.
V.E. Adler. 27 April 2005, Loughborough.
2. [pdf] Some incidence theorems and integrable discrete equations.
V.E. Adler. 25 April 2005, Loughborough.
1.   [pdf] Some incidence theorems and integrable discrete equations.
V.E. Adler. 2 December 2004, TU Berlin.

V.E. Adler / Last updated: March 21, 2015