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VERSION:2.0
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SUMMARY:On the Dirichlet problem for p-harmonic maps
DTSTART:20140311T161500
DTEND:20140311T171500
DTSTAMP:20260407T230506Z
UID:8c4f82a65c0e5a048699613a6ff1a351ef07456955df17c028bb879b
CATEGORIES:Conferences - Seminars
DESCRIPTION:Giona Veronelli\nGeometry and Dynamics SeminarAbstract: We wil
 l deal with the Dirichlet problem for p-harmonic maps between Riemannian m
 anifolds. After introducing the setting\, we will discuss some techniques 
 permitting to solve the problem either when the target is compact and nega
 tively curved or when the image is contained in a geodesic ball. The proof
  for compact targets uses some ideas of White to define the relative d-hom
 otopy type of Sobolev maps\, and the regularity theory by Hardt and Lin. I
 n case of maps into a geodesic ball\, some approaches of different nature 
 will be presented. This is a joint work with Stefano Pigola.
LOCATION:MA A3 31 http://plan.epfl.ch/?room=MA%20A3%2031
STATUS:CONFIRMED
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