We investigate self-similar solutions to the inverse mean curvature flow in Euclidean space. Generalizing Andrews\u27 theorem that circles are the only compact homothetic planar solitons, we apply the Hsiung-Minkowski integral formula to prove the rigidity of the hypersphere in the class of compact expanders of codimension one. We also establish that the moduli space of compact expanding surfaces of codimension two is large. Finally, we update the list of Huisken-Ilmanen\u27s rotational expanders by constructing new examples of complete expanders with rotational symmetry, including topological hypercylinders, called infinite bottles, that interpolate between two concentric round hypercylinders
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...
In first part of this thesis we consider the Ricci flow, an evolution equation for Riemannian metric...
We provide a new construction of Lagrangian surfaces in C2 in terms of two planar curves. When we t...
AbstractIn this paper, we study the existence, uniqueness and asymptotic behavior of rotationally sy...
In the first chapter of this thesis, after a brief introduction to the mean curvature ow and tran...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2016.Cataloged fro...
In this paper we introduce and study a notion of mean curvature flow soliton in Riemannian ambient s...
In the first part of this thesis, we give a classification of all self-similar solutions to the curv...
In the mean curvature flow theory, a topic of great interest is to study possible singularitiesof th...
Abstract. In the present article we obtain classification results and topological obstructions for t...
Thesis (Ph.D.)--University of Washington, 2014We construct new examples of self-shrinking solutions ...
We investigate the existence of graphs that are solitons for the flow of the mean curvature. Under so...
In this note we prove a correspondence, first found by Smoczyk in the hypersurface case, between con...
We study some properties of mean curvature flow solitons in general Riemannian manifolds and in warp...
In this paper, we obtain rigidity results and obstructions on the topology at infinity of translati...
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...
In first part of this thesis we consider the Ricci flow, an evolution equation for Riemannian metric...
We provide a new construction of Lagrangian surfaces in C2 in terms of two planar curves. When we t...
AbstractIn this paper, we study the existence, uniqueness and asymptotic behavior of rotationally sy...
In the first chapter of this thesis, after a brief introduction to the mean curvature ow and tran...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2016.Cataloged fro...
In this paper we introduce and study a notion of mean curvature flow soliton in Riemannian ambient s...
In the first part of this thesis, we give a classification of all self-similar solutions to the curv...
In the mean curvature flow theory, a topic of great interest is to study possible singularitiesof th...
Abstract. In the present article we obtain classification results and topological obstructions for t...
Thesis (Ph.D.)--University of Washington, 2014We construct new examples of self-shrinking solutions ...
We investigate the existence of graphs that are solitons for the flow of the mean curvature. Under so...
In this note we prove a correspondence, first found by Smoczyk in the hypersurface case, between con...
We study some properties of mean curvature flow solitons in general Riemannian manifolds and in warp...
In this paper, we obtain rigidity results and obstructions on the topology at infinity of translati...
This dissertation concerns the Inverse Mean Curvature Flow of closed hypersurfaces in Euclidean Spac...
In first part of this thesis we consider the Ricci flow, an evolution equation for Riemannian metric...
We provide a new construction of Lagrangian surfaces in C2 in terms of two planar curves. When we t...