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SUMMARY:On Hamiltonian structures of quasi-Painleve equations
DTSTART;VALUE=DATE-TIME:20230623T093000Z
DTEND;VALUE=DATE-TIME:20230623T100000Z
DTSTAMP;VALUE=DATE-TIME:20240520T064857Z
UID:indico-contribution-3@cern.ch
DESCRIPTION:Speakers: Dr. FILIPUK\, Galina (University of Warsaw)\nThe qua
si-Painleve property of a system of ordinary differential\nequations\, her
e meaning the condition that movable singularities reachable by analytic c
ontinuation along finite length curves are at worst algebraic branch point
s\, is described in terms of global Hamiltonian structures on an analogue
of Okamoto’s spaces of initial conditions for the Painleve equations. T
his is a joint work with A. Stokes (Japan).\n\nhttp://indico.fuw.edu.pl/co
ntributionDisplay.py?contribId=3&sessionId=8&confId=67
LOCATION:Faculty of Physics\, University of Warsaw Lecture hall: 0.06
URL:http://indico.fuw.edu.pl/contributionDisplay.py?contribId=3&sessionId=
8&confId=67
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