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UID:8537@i2m.univ-amu.fr
DTSTART;TZID=Europe/Paris:20241114T140000
DTEND;TZID=Europe/Paris:20241114T153000
DTSTAMP:20250109T132445Z
URL:https://www.i2m.univ-amu.fr/evenements/a-brief-overview-of-morse-theor
 y/
SUMMARY:Guillaume Kineider (I2M\, AMU\, CNRS): A brief overview of Morse th
 eory
DESCRIPTION:Guillaume Kineider: Morse theory forms the foundation of a fiel
 d known as differential topology. Its principle is to use analytical tools
  from the differential category to obtain information of a purely topologi
 cal nature. In (somewhat) technical terms\, the most important result in M
 orse theory is the construction of Morse homology\, which computes the (si
 ngular) homology of a manifold by studying the critical points of certain 
 smooth functions on it.\n\nBut there is no need to understand this last st
 atement to follow my presentation! To warm up\, we will start by decomposi
 ng manifolds into cells using a so-called Morse function\, and then begin 
 our journey toward Morse homology. Will we reach it? That’s anyone’s g
 uess... see you on Thursday at 2 p.m. to find out!
CATEGORIES:Séminaire,Doctorant⋅es de l'I2M
LOCATION:I2M Saint-Charles - Salle de séminaire\, Université Aix-Marseill
 e\, Campus Saint-Charles\, 3 Place Victor Hugo\, Marseille\, 13003\, Franc
 e
X-APPLE-STRUCTURED-LOCATION;VALUE=URI;X-ADDRESS=Université Aix-Marseille\,
  Campus Saint-Charles\, 3 Place Victor Hugo\, Marseille\, 13003\, France;X
 -APPLE-RADIUS=100;X-TITLE=I2M Saint-Charles - Salle de séminaire:geo:0,0
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