Add to ORKGTobias Colding, born in Copenhagen, received his Ph.D. in 1992 at the University of Pennsylvania under Chris Croke. Since 2005 Colding has been a professor of mathematics at MIT. He was on the faculty at the Courant Institute of New York University in various positions from 1992 to 2008. In the early stage of his career, Colding did impressive work on manifolds with bounds on Ricci curvature. In 1998, he gave an invited address to the ICM in Berlin. He began coauthoring with William P. Minicozzi at this time: first on harmonic functions and later on minimal surfaces. In 2010 Tobias H. Colding received the Oswald Veblen Prize in Geometry together with William Minicozzi II for their profound work on minimal surfaces. Since 2008 he has b...
Since the seminal work of [92] on coupling the level set method of [69] to the equations for two-pha...
Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric ...
In this paper we introduce semi-implicit methods for evolving interfaces by mean curvature flow and ...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
ABSTRACT. We continue our investigation of the "level-set " technique for describing the g...
The level set method was devised by Osher and Sethian in [56] as a simple and versatile method for c...
Level set solutions are an important class of weak solutions to the mean curvature flow which allow ...
PROPAGATING fronts with speeds linearly dependent on curvature is foundational to the level set meth...
Abstract: "We propose a finite element algorithm for computing the motion of a surface moving by mea...
Abstract We study hypersurfaces moving under flow that depends on the mean curvature. The approach i...
This paper is concerned with the study of a geometric flow whose law involves a singular integral o...
We propose a new scheme for the level set approximation of motion by mean curvature (MCM). The schem...
An advantage of using level set methods for moving boundary problems is that geometric quantities su...
We introduce a new notion of viscosity solutions for the level set formulation of the motion by crys...
Modeling of a wide class of physical phenomena, such as crystal growth and flame propagation, leads ...
Since the seminal work of [92] on coupling the level set method of [69] to the equations for two-pha...
Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric ...
In this paper we introduce semi-implicit methods for evolving interfaces by mean curvature flow and ...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
ABSTRACT. We continue our investigation of the "level-set " technique for describing the g...
The level set method was devised by Osher and Sethian in [56] as a simple and versatile method for c...
Level set solutions are an important class of weak solutions to the mean curvature flow which allow ...
PROPAGATING fronts with speeds linearly dependent on curvature is foundational to the level set meth...
Abstract: "We propose a finite element algorithm for computing the motion of a surface moving by mea...
Abstract We study hypersurfaces moving under flow that depends on the mean curvature. The approach i...
This paper is concerned with the study of a geometric flow whose law involves a singular integral o...
We propose a new scheme for the level set approximation of motion by mean curvature (MCM). The schem...
An advantage of using level set methods for moving boundary problems is that geometric quantities su...
We introduce a new notion of viscosity solutions for the level set formulation of the motion by crys...
Modeling of a wide class of physical phenomena, such as crystal growth and flame propagation, leads ...
Since the seminal work of [92] on coupling the level set method of [69] to the equations for two-pha...
Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric ...
In this paper we introduce semi-implicit methods for evolving interfaces by mean curvature flow and ...