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PRODID:-//Memento EPFL//
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SUMMARY:Arc spaces\, integrals and duality
DTSTART:20240430T121500
DTEND:20240430T140000
DTSTAMP:20260430T150504Z
UID:ce6ad0396e5423b2caacf29def0613b6a4972f039b1ce68f3ec2392d
CATEGORIES:Conferences - Seminars
DESCRIPTION:Dimitri Wyss\nThe arc space of an algebraic variety is a non-a
 rchimedean analogue of the path space of a manifold. It comes with an inte
 gration theory\, which can be used to describe the geometry of the underly
 ing variety.\n\nThis point of view was pioneered by Batyrev in the 90’s\
 , who proved that birational Calabi-Yau varieties have the same Betti numb
 ers. I will present an overview of how one can apply these ideas in a vari
 ety of situations\, all of which having some relation to theoretical physi
 cs\, in particular string theory.\n 
LOCATION:BSP 727 https://plan.epfl.ch/?room==BSP%20727
STATUS:CONFIRMED
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