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UID:news244@dmi.unibas.ch
DTSTAMP;TZID=Europe/Zurich:20180716T211049
DTSTART;TZID=Europe/Zurich:20151120T110000
SUMMARY:Seminar in Numerical Analysis: Stefan Sauter (University of Zürich
 )
DESCRIPTION:In this talk we consider an intrinsic approach for the direct c
 omputation of the fluxes for problems in potential theory. We present a ge
 neral method for the derivation of intrinsic conforming and non-conforming
  finite element spaces and appropriate lifting operators for the evaluatio
 n of the right-hand side from abstract theoretical principles related to t
 he second Strang Lemma. This intrinsic finite element method is analyzed a
 nd convergence with optimal order is proved.
X-ALT-DESC:In this talk we consider an intrinsic approach for the direct co
 mputation of the fluxes for problems in potential theory. We present a gen
 eral method for the derivation of intrinsic conforming and non-conforming 
 finite element spaces and appropriate lifting operators for the evaluation
  of the right-hand side from abstract theoretical principles related to th
 e second Strang Lemma. This intrinsic finite element method is analyzed an
 d convergence with optimal order is proved. 
DTEND;TZID=Europe/Zurich:20151120T120000
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