Scherk-like Translators for Mean Curvature Flow
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If you have a question about this talk, please contact Ivan Moyano.
We prove existence and uniqueness for a two-parameter family
of translators for mean curvature flow.
We get additional examples by taking limits at
the boundary of the parameter space.
Some of the translators resemble well-known minimal surfaces (Scherk’s doubly periodic minimal surfaces,
helicoids), but others have no minimal surface analogs. This is a joint work with David
Hoffman and Brian White.
This talk is part of the Partial Differential Equations seminar series.
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Friday 03 May 2019, 14:00-15:00