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BEGIN:VEVENT
UID:news459@dmi.unibas.ch
DTSTAMP;TZID=Europe/Zurich:20181228T165150
DTSTART;TZID=Europe/Zurich:20150311T151500
SUMMARY:Seminar Analysis: Giuseppe Genovese (University of Zurich)
DESCRIPTION:The  DNLS  equation  is  an  integrable  PDE\,  in  the  sense 
  that  there  are infinitely  many  Hamiltonians  associated  to  it.   Th
 e  aim  of  the  talk  is  to  present  the construction of infinitely man
 y functional measures associated to these integrals of motion of the equat
 ion\, each measure being supported on Sobolev spaces of increasing regular
 ity. These  are  natural  candidates  to  be  the  invariant  measures  as
 sociated  to  the  DNLS  eq. Invariant  measures  are  a  crucial  tool  i
 n  the  theory  of  integrable  PDEs\,  useful  e.g.   to prove long time 
 properties of regular solutions.  The introductory general aspects will be
  reviewed and the new results on DNLS\, obtained in collaboration with R. 
 Luc (ICMAT\,Madrid) and D. Valeri (MSC\, Beijing)\, will be presented.
X-ALT-DESC: \nThe  DNLS  equation  is  an  integrable  PDE\,  in  the  sens
 e  that  there  are infinitely  many  Hamiltonians  associated  to  it.   
 The  aim  of  the  talk  is  to  present  the construction of infinitely m
 any functional measures associated to these integrals of motion of the equ
 ation\, each measure being supported on Sobolev spaces of increasing regul
 arity. These  are  natural  candidates  to  be  the  invariant  measures  
 associated  to  the  DNLS  eq. Invariant  measures  are  a  crucial  tool 
  in  the  theory  of  integrable  PDEs\,  useful  e.g.   to prove long tim
 e properties of regular solutions.  The introductory general aspects will 
 be reviewed and the new results on DNLS\, obtained in collaboration with R
 . Luc (ICMAT\,Madrid) and D. Valeri (MSC\, Beijing)\, will be presented.
DTEND;TZID=Europe/Zurich:20150311T161500
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