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SUMMARY:Jacobi forms and modular differential equations [MPIM]
DTSTART:20250115T133000Z
DTEND:20250115T143000Z
DTSTAMP:20260420T154900Z
UID:indico-event-168@math-events.uni-bonn.de
DESCRIPTION:Speakers: Dmitrii Adler (MPIM)\n\nNumber theory lunch seminar
  \nhttps://www.mpim-bonn.mpg.de/node/13812\nThe Serre derivative is a dif
 ferential operator that maps modular forms of weight $k$ to modular forms 
 of weight $k+2$. One can study differential equations with respect to this
  differential operator. Some examples of such equations are the Ramanujan 
 system of differential equations and the Kaneko-Zagier equation. A similar
  construction takes place in the case of Jacobi forms. In my talk I will d
 iscuss differential equations of Jacobi forms and some applications relate
 d to the elliptic genus of Calabi-Yau manifolds. This is joint work with V
 alery Gritsenko.\n \n\nhttps://math-events.uni-bonn.de/event/168/
LOCATION:MPIM\, Vivatsgasse\,  7 - Lecture Hall (Max Planck Institute for 
 Mathematics)
URL:https://math-events.uni-bonn.de/event/168/
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