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UID:DSC-13494
DTSTART;TZID=Europe/Berlin:20171115T170000
SEQUENCE:1506588985
TRANSP:OPAQUE
DTEND;TZID=Europe/Berlin:20171115T180000
URL:https://www.dresden-science-calendar.de/calendar/en/detail/13494
LOCATION:TUD Willers-Bau\, Zellescher Weg 12-1401069 Dresden
SUMMARY:Denk: $L^p$-theory for linear plate equations: maximal regularity a
 nd generation of semigroups
CLASS:PUBLIC
DESCRIPTION:Speaker: Prof. Dr. Robert Denk \nInstitute of Speaker: Universi
 tät Konstanz\nTopics:\nMathematik\n Location:\n  Name: TUD Willers-Bau (W
 IL C 307)\n  Street: Zellescher Weg 12-14\n  City: 01069 Dresden\n  Phone:
  \n  Fax: \nDescription: We consider the linear thermoelastic plate equati
 on with free boundary conditions. It can be shown that this equation in su
 fficiently smooth domains is uniquely solvable in $L^p$-Sobolev spaces (i.
 e.\, it has  maximal regularity) and that the associated first-order syste
 m generates and analytic semigroup. The proof is based on careful symbol e
 stimates for the solution operators. We also discuss the situation for str
 ucturally damped plate equations and partial damping.    The talk is based
  on joint results with Yoshihiro Shibata (Tokyo)\, Roland Schnaubelt (Karl
 sruhe)\, and Felix Kammerlander (Konstanz).
DTSTAMP:20260713T000210Z
CREATED:20170928T085625Z
LAST-MODIFIED:20170928T085625Z
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