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UID:news239@dmi.unibas.ch
DTSTAMP;TZID=Europe/Zurich:20180716T205454
DTSTART;TZID=Europe/Zurich:20160527T110000
SUMMARY:Seminar in Numerical Analysis: Ana Djurdjevac (FU Berlin)
DESCRIPTION:Sometimes the partial differential equations with random coeffi
cients can be better formulated on moving domains\, especially in biologic
al applications. We will introduce and analyse the advection-diffusion equ
ations with random coefficients on moving hypersurfaces. Under suitable re
gularity assumptions\, using Banach-Necas-Babuska theorem\, we will prove
existence and uniqueness of the weak solution and also we will give some r
egularity results about the solution. For discretization in space\, we wil
l apply the evolving surface finite element method. In order to deal with
uncertainty\, we will use Monte Carlo method. Furthermore\, we plan to dis
cuss the case when the velocity of the hypersuraface is random.This is a j
oint work with Charles M. Elliott (University of Warwick\, UK)\, Ralf Korn
huber (Free University Berlin\, Germany) and Thomas Ranner (University of
Leeds\, UK).
X-ALT-DESC:Sometimes the partial differential equations with random coeffic
ients can be better formulated on moving domains\, especially in biologica
l applications. We will introduce and analyse the advection-diffusion equa
tions with random coefficients on moving hypersurfaces. Under suitable reg
ularity assumptions\, using Banach-Necas-Babuska theorem\, we will prove e
xistence and uniqueness of the weak solution and also we will give some re
gularity results about the solution. For discretization in space\, we will
apply the evolving surface finite element method. In order to deal with u
ncertainty\, we will use Monte Carlo method. Furthermore\, we plan to disc
uss the case when the velocity of the hypersuraface is random.
This is a joint work with Charles M. Elliott (University of Warwick\, UK)\
, Ralf Kornhuber (Free University Berlin\, Germany) and Thomas Ranner (Uni
versity of Leeds\, UK).
DTEND;TZID=Europe/Zurich:20160527T120000
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