Add to ORKGMuch of geometric analysis can be described as the study of (hyper)surfaces changing shape subject to certain equations. Here we study one such equation, mean curvature ow, which decreases the area of a surface as fast as possible. However, solutions to this equation develop singularities. I present a detailed analysis of this development under suitable restrictions on curvature.Assuming mean-convexity and type-I growth of curvature in time, there are three main parts to the results:1) I collect well-known results to describe the shape of (rescalings) blow-ups near singularities in a specific way with high precision.2) Colding and Minicozzi showed uniqueness of blow-ups and Andrews showed a restriction on the surface collapsing. I combine ...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...
We study solutions of high codimension mean curvature flow defined for all negative times, usually r...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
Once one knows that singularities occur, one naturally wonders what the singularities are like. For ...
Under certain conditions such as the $2$-convexity, a singularity of the level set flow is of type I...
The mean curvature flow arises material science and condensed matter physics and has been recently s...
Author Manuscript August 26, 2009It has long been conjectured that starting at a generic smooth clos...
We study noncompact surfaces evolving by mean curvature flow (mcf). For an open set of initial data ...
Figure 1: The armadillo man model (left) and the results of traditional MCF (top) compared to the re...
We study noncompact surfaces evolving by mean curvature flow (mcf). For an open set of initial data ...
We study the evolution by mean curvature of a smooth n–dimensional surfaceM Rn+1, compact and with p...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...
We study solutions of high codimension mean curvature flow defined for all negative times, usually r...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
Once one knows that singularities occur, one naturally wonders what the singularities are like. For ...
Under certain conditions such as the $2$-convexity, a singularity of the level set flow is of type I...
The mean curvature flow arises material science and condensed matter physics and has been recently s...
Author Manuscript August 26, 2009It has long been conjectured that starting at a generic smooth clos...
We study noncompact surfaces evolving by mean curvature flow (mcf). For an open set of initial data ...
Figure 1: The armadillo man model (left) and the results of traditional MCF (top) compared to the re...
We study noncompact surfaces evolving by mean curvature flow (mcf). For an open set of initial data ...
We study the evolution by mean curvature of a smooth n–dimensional surfaceM Rn+1, compact and with p...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
We study solutions of the mean curvature flow which are defined for all negative times, usually call...
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...