1. S. M. Sergeev, Spectral Decomposition of R – Matrices for Exceptional Lie Algebras. Modern Phys. Lett. A 6 (1991) 923 – 927
2. S. M. Sergeev, E8 Level 2 RSOS Model. Modern Phys. Lett. A 6 (1991) 2335 – 2344
3. A. V. Batunin, S. M. Sergeev, Transfer Matrix Method and Intermittence generating Dynamics in Hadron Physics. Phys. Lett. B 327 (1994) 293 – 300
4. S. M. Sergeev, G. G. Volkov, The Non-Abelian Gauge Family Symmetry in the Four Dimensional Free Fermion Super-string Approach. Rus. J. of Nucl. Phys. (Yad. Fiz.) 57 N. 1 (1994) 168 – 174
5. A. A. Maslikov, S. M. Sergeev, G. G. Volkov, Grand Unified String Theories with SU(3) Gauge Family Symmetry. Phys. Lett. B 328 (1994) 319 – 328
6. A. A. Maslikov, S. M. Sergeev, G. G. Volkov, The Grand Unified String Theories with Non – Abelian Gauge Family Symmetry in Free Fermion Formulation. Physical Review D 50 (1994) 7440-7449
7. A. A. Maslikov, S. M. Sergeev, G. G. Volkov, String Motivated Grand Unified Theories with Horizontal Gauge Symmetry. Int. J. of Mod. Phys. A 9 (1994) 5369-5385
8. V. V. Mangazeev, S. M. Sergeev, Yu. G. Stroganov, New Series of 3D Lattice Integrable Models. Int. J. of Mod. Phys. A, 9 (1994) 5517-5530
9. H. E. Boos, V. V. Mangazeev, S. M. Sergeev, Modified Tetrahedron Equations and Related 3D Integrable Models. Int. J. of Mod. Phys. A 10 (1995)
10. V. V. Mangazeev, S. M. Sergeev, Yu. G. Stroganov, New solution of vertex type tetrahedron equations. Mod. Phys. Lett. A 10 (1995) 279-287
11. S. M. Sergeev, V. V. Mangazeev and Yu. G. Stroganov, Vertex reformulation of the Bazhanov – Baxter model. J. Stat. Phys. 82 (1996) 31 – 50
12. S. M. Sergeev, H. E. Boos, V. V. Mangazeev and Yu. G. Stroganov, $\Psi$ – vectors for three-dimensional models. Mod. Phys. Lett. A 11 (1996) 491-498
13. J.-M. Maillard,
14. J.-M. Maillard, S. M. Sergeev, Three dimensional integrable models based on modified tetrahedron equations and quantum dilogarithm. Physics Letters B 405 (1997) 55 – 63
15. S. M. Sergeev, Two-dimensional R-matrices – descendants of three-dimensional R-matrices. Mod. Phys. Lett. A 12 (1997) 1393 – 1410
16. R. M. Kashaev, S. M. Sergeev, On pentagon, ten-term, and tetrahedron relations. Commun. Math. Phys. 195 (1997) 211-216
17. S. M. Sergeev, Solutions of the functional tetrahedron equation connected with the local Yang – Baxter equation for the ferro-electric condition. Lett. Math. Phys. 45 (1998) 113-119
18. S. M. Sergeev, 3D symplectic map. Phys. Lett. A 253 (1999) 145-150
19. S. M. Sergeev, A three-dimensional integrable quantum mapping. Theoretical and Mathematical Physics 118 (1999) 479-487
20. S. M. Sergeev, Solitons in a 3d integrable model. Phys. Lett. A 265 (2000) 364-368
21. R. M. Kashaev,
22. S. M. Sergeev, Quantum 2 + 1 evolution model. J. Phys. A: Math. Gen. 32 (1999) 5693-5714
23. S. M. Sergeev, On exact solution of a classical 3D integrable model. J. Nonlinear Math. Phys. 1 (2000) 57-72
24. S. M. Sergeev, Auxiliary transfer matrices for three-dimensional integrable models. Theoretical and Mathematical Physics 124 (2000) 391-409
25. S. M. Sergeev, Quantum matrices of the coefficients of a discrete linear problem. (Russian) Zap. Nauchn. Sem. S.-Petersburg. Otdel. Mat. Inst. Steklov. (POMI) 269 No. 16 (2000) Vopr. Kvant. Teor. Polya i Stat. Fiz. 292-307, 370-371
Translation: Coefficient Matrices of a Quantum Discrete Auxiliary Linear Problem. Journal of Mathematical Sciences 115(1) (2003) 2049-2057
26. S. Sergeev, Integrable
three-dimensional models in wholly discrete space-time. Integrable
structures of exactly solvable two-dimensional models of quantum field theory
(
27. S. Sergeev, Complex of
three-dimensional solvable models. J. Phys. A: Math. Gen. 34 (2001)
10493-10503 (Symmetries and integrability of difference equations (
28. G. Pronko and S. Sergeev, Quantum relativistic Toda chain. J. Appl. Math. 1 (2001) 47-68
29. V. V. Mangazeev and S. M. Sergeev, The continuous limit of the triple $\tau$-function model. Theoretical and Mathematical Physics 129 (2001) 317-326
30. G. P. Pronko and S. M. Sergeev, Q-operators for the simple quantum relativistic Toda chain. Phys. Atomic Nuclei 65 (2002) 1095-1099 (Symposium on Integrable Systems (Dubna, 2000))
31. S. Pakuliak and S. Sergeev,
Quantum relativistic Toda chain at root of unity: invariant approach.
Czechoslovak J. Phys. 51 (2001) 1414-1419 (Quantum groups and integrable systems
(
32. S. Pakuliak and S. Sergeev, Quantum relativistic Toda chain at root of unity: isospectrality, modified Q-operator, and functional Bethe Ansatz. Int. J. Math. Math. Sci. 31 (2002) 513-553
33. G. von Gehlen,
34. A. P. Isaev and S. M. Sergeev, Quantum Lax operators and discrete 2+1-dimensional integrable models, Lett. Math. Phys. 64 (2003) 57-64
35. S. Z. Pakuliak and S. M. Sergeev, Spectral Curves and Parameterization of a Discrete Integrable Three Dimensional Model, Theoretical and Mathematical Physics 136 (2003) 917-935
36. S. M. Sergeev, Functional equations and quantum separation of variables for 3d spin models. Theoretical and Mathematical Physics 138 (2004) 226-237
37. G. von Gehlen, S. Pakulyak and S. Sergeev, The modified tetrahedron equation and its solutions, Int. J. Mod. Phys. A19S2 (2004) 179-204
38. S. Pakuliak, S. Sergeev, G. v. Gehlen, Theta function parameterization and fusion for 3-D integrable Boltzmann weights. J. Phys. A. 37 (2004) 1159-1179
39. S. M. Sergeev, Evidence for a phase transition in three dimensional lattice models. Theoretical and Mathematical Physics 138 (2004) 310-321
40. S. M. Sergeev, Evolution operator for a quantum pendulum. Theoretical and Mathematical Physics 138 (2004) 28-32
41. S. M. Sergeev, Quantization scheme for modular q-difference equations. Theoretical and Mathematical Physics 142 (2005) 422-430
42. S. M. Sergeev, Quantum integrable models in discrete 2+1 dimensional space-time: auxiliary linear problem on a lattice, zero curvature representation, isospectral deformation of the Zamolodchikov-Bazhanov-Baxter model. Particles and Nuclei 35 (2004) 1051-1111.
43. G. von Gehlen, S. Pakuliak
and
44. S. M. Sergeev, Thermodynamic limit for a spin lattice. Journal of Statistical Physics 123 1231-1250 (2006)
45. V. Bazhanov and S. Sergeev, Zamolodchikov's tetrahedron Equation and Hidden Structure of Quantum Groups, J. Phys. A: Math. Gen. 39 (2006) 3295-3310
46. S. Sergeev, Integrability of q-oscillator lattice model. Physics Letters A 357 (2006) 417-419
47. S. Sergeev, Quantum curve in q-oscillator model. International Journal of Mathematics and Mathematical Sciences (2006) DOI 10.1155/IJMMS/2006/92064
48. S. Sergeev, Ansatz of Hans Bethe for a two-dimensional Bose gas. J. Phys. A: Math. Gen. 39 (2006) 3035-3045
49. M. Bortz and S. Sergeev, The q-deformed Bose gas: integrability and thermodynamics. Eur. Phys. J. B 51 395-405 (2006)
50. S. Sergeev, Evolution operators for quantum chains. J. Phys. A: Math. Theor. 40 (2007) F209-F213
51. V. V. Bazhanov, V. V.
Mangazeev and S. M. Sergeev, Faddeev-Volkov solution of the Yang-Baxter
Equation and Discrete Conformal Symmetry. Nuclear Physics B 784 [FS] (2007)
234–258
52. S. Sergeev, Quantization of three-wave equations. J. Phys. A: Math. Theor. 40 (2007) 12709–12724
53. V. V. Bazhanov, V. V. Mangazeev and S. M. Sergeev, Exact solution of the Faddeev-Volkov model, preprint arXiv:0706.3077, accepted in Phys. Lett. A
54. S. M. Sergeev, Tetrahedron equations and nilpotent subalgebras of Uq(sln), preprint arXiv:0707.4029, accepted in Lett. Math. Phys.
1. V. V. Mangazeev, S. M. Sergeev and Yu. G. Stroganov, The tetrahedron equation and three-dimensional integrable models. Proceeding of Geometry and Integrable models, eds. Pyatov P. N., Solodukhin S. N., World Scienti.c Publishing Co., 1994, pp 3-19.
2. S. M. Sergeev, V. V. Bazhanov, H. E. Boos, V. V. Mangazeev and Yu. G. Stroganov, Tetrahedron equation for pedestrians. Proceedings of the HEP and QFT Conference, Zvenigorod, September 1995.
3. V. V. Mangazeev, Yu. G. Stroganov and S. M. Sergeev, The Tetrahedron Equation and its Solutions. Resent Progress in Statistical Mechanics and Quantum Field Theory, eds. P. Bouwknegt, P. Fendley, J. Minahan, D. Nemschansky, K. Pilch, H. Saleur and N. P. Warner, World Scienti.c Publishing Co., 1995, pp. 255 – 270.
4. S. M. Sergeev, V. V.
Mangazeev, G. E. Boos and Yu. G. Stroganov, Introduction into tetrahedron
equation. Proceedings of the Theoretical Physics Conference, ITEP,
5. S. M. Sergeev, V. V.
Mangazeev, G. E. Boos and Yu. G. Stroganov, Vertex – IRF duality in three
dimensions. Proceedings of the Conference on Mathematical Physics,
6. H. E. Boos, V. V. Mangazeev, S. M. Sergeev, Modified tetrahedron equation and related 3D models. Proceedings of XX International Colloquium on Group Theoretical Methods in Physics, Tonoyaka, World Scientific Publishing Co., 1995, pp. 314-319.
7. S. M. Sergeev, Operator
solutions of simplex equations. Proc. X Int. Conf. Problems of Quantum Field
Theory (Alushta, 1996) (
8. G. von Gehlen, S. Pakuliak and
S. Sergeev, 3-dimensional integrable lattice models and the
Bazhanov-Stroganov model. Nankai Tracts in Math. 10: Differential Geometry
and Physics, ed. Mo-Lin Ge and Weiping Zhang, World Scientific,
1*. A. V. Batunin and S. M. Sergeev, Second order quadratic mapping, Preprint BINP 96 – 01
2*. S. M. Sergeev, $Z_N^{\otimes n}$- Broken Model. Preprint IHEP 92 – 07
3*. S. M. Sergeev, Statistical Mechanics for $Z_N^{\otimes n}$-Broken Model. Preprint IHEP 92 – 46
4. S. M. Sergeev, V. V. Bazhanov and V. V. Mangazeev, Quantum Dilogarithm and Tetrahedron Equation. Preprint IHEP 95 – 129
5*. S. M. Sergeev, On a two dimensional system associated with the complex of the solutions of the Tetrahedron equation. Preprint solv-int/9709013
6*. I. G. Korepanov and S. M. Sergeev, Eigenvector and eigenvalue problem for 3D bosonic model. Preprint solv-int/9802014
7. S. Sergeev, Completely integrable discrete systems in three dimensional space-time. Adv PhD thesis, S. Petersburg Division of Mathematical Institute (2001) (in Russian), available at http://tpsrv.anu.edu.au/Members/sergeev
8**.
9**.
10**.
11. V. Bazhanov, V. Mangazeev and
12. V. Bazhanov, V. Mangazeev and