Clone of Curvature of minimal graphs
Encuentro REAG 2022, Instituto de Matemáticas de la Universidad de Granada, IMAG, 10 y 11 de marzo de 2022
Encuentro REAG 2022, Instituto de Matemáticas de la Universidad de Granada, IMAG, 10 y 11 de marzo de 2022
In this talk, I will report on a recent work with Kyeongsu Choi and Robert Haslhofer, in which we show that every mean convex, non-collapsed, translator in R^4 is a member of a one parameter family of translators, which was earlier constructed by Hoffman, Ilmanen, Martín and White.
In this talk we study applications of the Kulkarni-Pinkall form to the study of locally strictly convex immersions in the 3-dimensional Hyperbolic Space.
Julián Pozuelo (Universidad de Granada)
Marilena Moruz (Alexandru Ioan Cuza University of Iaşi)
Brian White (Stanford University)
In this talk, a useful weak formulation of the mean curvature flow (MCF) for surfaces with boundary that gives existence for all time with arbitrary initial data will be described.
In this talk, we will describe the 1-parameter family of horizontal Delaunay surfaces in S2×R and H2×R with supercritical constant mean curvature.
We consider hypersurfaces of products M×R with constant r-th mean curvature — to be called Hr-hypersurfaces — where M is an arbitrary Riemannian manifold.