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ÊÀËÜÍÈÖÊÈÉ Â.Ñ. |
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ÎÁÐÀÇÎÂÀÍÈÅ
ÑÀÍÊÒ-ÏÅÒÅÐÁÓÐÃÑÊÈÉ ÃÎÑÓÄÀÐÑÒÂÅÍÍÛÉ ÓÍÈÂÅÐÑÈÒÅÒ
Êàôåäðà Âûñøåé ãåîìåòðèè
Êàíäèäàò ôèçèêî-ìàòåìàòè÷åñêèõ
íàóê, 2000.
Òåìà äèññåðòàöèè: “Àëãåáðû ßêîáè íà ãëàäêèõ ìíîãîîáðàçèÿõ ñ ëèíåéíîé ñâÿçíîñòüþ”
Íàó÷íûé êîíñóëüòàíò: ïðîô., ä.ô.-ì.í. Þ.Í. Áèáèêîâ
Îïïîíåíò: ïðîô., ä.ô.-ì.í. À.Ì. Âåðøèê
Äèïëîì ÑÏáÃÓ, 1993
Òåìà äèïëîìà: «Ñèììåòðèè ãåîäåçè÷åñêîãî ïîòîêà àôôèííîé ñâÿçíîñòè»
ÏÐÎÔÅÑÑÈÎÍÀËÜÍÀß ÄÅßÒÅËÜÍÎÑÒÜ
×ëåí ÅÂÐÎÏÅÉÑÊÎÃÎ ÌÀÒÅÌÀÒÈ×ÅÑÊÎÃÎ ÎÁÙÅÑÒÂÀ
×ëåí ÑÀÍÊÒ-ÏÅÒÅÐÁÓÐÃÑÊÎÃÎ ÌÀÒÅÌÀÒÈ×ÅÑÊÎÃÎ ÎÁÙÅÑÒÂÀ
American Mathematical Society Reviews
Ðåäàêòîð Central
European Journal for Mathematics
Âåñòíèê
Ñàíêò-Ïåòåðáóðãñêîãî ãîñóäàðñòâåííîãî óíèâåðñèòåòà 1993-1994
Èçäàòåëüñòâî
ÍÈÈ Õèìèè ÑÏáÃÓ 1995-1996
Æóðíàë “ÃÐÀÂÈÒÀÖÈß” 1997-1998
ÃÐÀÍÒÛ È ÄÈÏËÎÌÛ
1993 Êðàñíûé äèïëîì ÑÏáÃÓ
1993-1995 Èññëåäîâàòåëüñêèé ãðàíò AMS ëó÷øèì ñòóäåíòàì-ìàòåìàòèêàì
1995-1996 ÐÔÔÈ ãðàíò ¹ NVX300 è
303 (èñïîëíèòåëü)
1995, 1996 Ïåðñîíàëüíûé ãðàíò Ïðàâèòåëüñòâà Ñàíêò-Ïåòåðáóðãà è
Êîìèòåòà Îáðàçîâàíèÿ ÐÔ
1997 Ãðàíò DAAD ñòóäåí÷åñêèõ
îáìåíîâ
1996-2001 ×ëåí íàó÷íîé øêîëû
Àëåêñàíäðîâà-Ðîõëèíà #96-15-96075
2002-2003 Èññëåäîâàòåëüñêèé ãðàíò ÐÔÔÈ ¹ ÓÐ.04.01.042
(èñïîëíèòåëü)
2003 Ïåðñîíàëüíûé ãðàíò Ïðàâèòåëüñòâà Ñàíêò-Ïåòåðáóðãà è
Êîìèòåòà Îáðàçîâàíèÿ ÐÔ ¹PD03-1.1-27
2004 ×ëåí íàó÷íîé øêîëû ¹
ÍØ.2271.2003.1
2004 Äîðîæíûé ãðàíò INTAS
2005 Äîðîæíûé ãðàíò EMU
2005 Íàó÷íàÿ ïðîãðàììà
Ìèíèñòåðñòâà îáðàçîâàíèÿ ÐÔ ÂÍÏ 3.1¹4733
ÄÎÊËÀÄÛ È ÍÀÓ×ÍÛÅ ÂÈÇÈÒÛ
Wuerzburg University, Brno University of
Technology (DGA)
ÏÓÁËÈÊÀÖÈÈ
· Automorphism of geodesic vector field // Vestn. St. Peterbg. Univ. Math., Allerton Press Inc., New York (28) #2 (1995), 19-20. (Zbl 0886.58010)
·
The
algebra of generalized Jacobi fields // J. Math. Sci., N.-Y., 91 #6, pp.
3476-3491 (1998) (Zbl 0890.53040, Zbl 0907.53031)
·
Symmetry
fields of geodesic vector fields // Differential Geometry and Application
(Brno, 1998), 355-359, Masaryk Univ, Brno, 1999 (Zbl 0945:58004)
·
Symmetries
of geodesic flows of affine connection. PhD Thesis, St. Petersburg State
University, 1999, 72 p.
·
Spray
algebra // Proc. Inst. Math. NAS Ukr., Math. Appl., v. 50, part III, pp.
1356-1360 (2004),
·
Polynomial
symmetries of flat and homogeneous connections // Diff. Geom. Fig. Manif.
V. 35 (2004) (ISSN 0321-4796)
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Nilpotent
fields completeness // Diff. Geom. Fig. Manif. V. 36 (2005)
·
The
Jacobi algebras of flat manifolds // J. Math. Sci., Springer US, v.131, pp.
5345-5350. (2005)
ÏÐÅÏÐÈÍÒÛ
·
The
Jacobi algebra classification on homogeneous manifolds // St. Petersburg
Mathematical Society Preprint #2004-03,
·
Symmetries
of Weak-Controllable Systems //St.Petersburg Mathematical Society
Preprint #2005-07
ÊÎÍÔÅÐÅÍÖÈÈ
·
Relation
between Yano-Ato operator and generalized Jacobi operator // Abstr. 2nd
Russian-German Geometry Meeting, P. 31
·
About
structure of the symmetrical tensor fields algebra automorphism // Proceedings
of the Lobachevsky Math Center, v. 18, p. 41-42, Kazan, 2002
· The flat geodesic flows symmetries // Thes. Int. Conf. “Kolmogorov-100”, Moscow, 2003, pp. 887-888
·
Spectral
classification of the flat torus // Proceedings of the Lobachevsky Math
Center, v. 22, Kazan, 2003
·
Spray
algebra // Symmetry in Nonlinear Mathematical Physics’2003 (SNMP’03).
·
The
completeness of the polynomial spray symmetries // X Int. Conf. dev. M.I.
Kravchuk, 13-16 May, Kyiv, Ukraine, 2004, p. 359.
·
Completeness
of NCS symmetries. // Proceed. Int. Conf. Analysis and Geometry. August
23-September 2. Novosibirsk. P. 121.
·
D-lift
of convolution algebras //Proc. Jacobi Int. Conf.
·
Symmetries
of Weak-Controllable Systems // SNMP’05, 18-26 June, 2005.
ÑÅÌÈÍÀÐÛ È ØÊÎËÛ
·
Russian-German
seminar “New tendencies in mathematics” (St. P.). 06/1996. Die Geodetische
Flussigkeiten.
·
Russian-German
seminar “New tendencies in mathematics” (Würzburg). 06/1997. Die
Multilinearen Felden.
·
St.
Petersburg Seminar on Representation Theory and Dynamical Systems. 16/06/1999.
Flows commuting with geodesic flows.
·
Geometry
seminar of Albertina University.
10/09/2003. Jacobi algebras.
·
Geometry
school at Novosibirsk university, 2005
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