BEGIN:VCALENDAR
PRODID:-//AT Content Types//AT Event//EN
VERSION:1.0
BEGIN:VEVENT
DTSTART:20170207T140000Z
DTEND:20170207T150000Z
DCREATED:20170201T130242Z
UID:ATEvent-1fb98e238f45492f8c00013807f4efd8
SEQUENCE:0
LAST-MODIFIED:20170203T165633Z
SUMMARY:"Minimal surfaces and geometric flows" Melanie Rupflin (Oxford)
DESCRIPTION:Abstract: The classical Plateau problems has been one of t
he most influential problems in the development of modern analysis. Po
sed initially by Lagrange\, it asks whether a closed curve in Euclidea
n space always spans a surfaces with minimal possible area\, a questio
n that was answered positively by Douglas and Rado around 1930. In thi
s talk I want to consider some aspects of the classical Plateau Proble
m and its generalisations and discuss furthermore how one can "flow" t
o such minimal surfaces by following a suitably defined gradient flow
of the Dirichlet energy\, i.e. of the integral of gradient squared.
LOCATION:MA119
PRIORITY:3
TRANSP:0
END:VEVENT
END:VCALENDAR