AbstractMotivated by a recent curvature flow introduced by Professor S.-T. Yau [S.-T. Yau, Private communication on his “Curvature Difference Flow”, 2007], we use a simple curvature flow to evolve a convex closed curve to another one (under the assumption that both curves have the same length). We show that, under the evolution, the length is preserved and if the curvature is bounded above during the evolution, then an initial convex closed curve can be evolved to another given one
Based on the recent work by Andrews and Bryan [2] we present a new proof of the celebrated Grayson's...
We study the evolution of compact convex curves in two-dimensional space forms. The normal speed is ...
summary:The gradient flow of bending energy for plane curve is studied. The flow is considered under...
In this paper, we will investigate a new curvature flow for closed convex plane curves which shorten...
AbstractMotivated by a recent curvature flow introduced by Professor S.-T. Yau [S.-T. Yau, Private c...
We show that any initial closed curve suitably close to a circle flows under length-constrained curv...
The motion of any smooth closed convex curve in the plane in the direction of steepest increase of i...
We consider the evolution of a closed convex hypersurface in euclidean space under a volume preservi...
A recent article [1] considered the so-called \u27ideal curve flow\u27, a sixth-order curvature flow...
2020, Mathematical Sciences Publishers. All rights reserved. We use a gradient flow to deform closed...
In [25], Smoczyk showed that expansion of convex curves and hypersurfaces by the reciprocal of the h...
AbstractThe problem of curve evolution as a function of its local geometry arises naturally in many ...
We consider the evolution of an entire convex graph in euclidean space with speed given by a symmetr...
Wheeler, G. (2013). On the curve diffusion flow of closed plane curves. Annali di Matematica Pura ed...
AbstractWe derive the evolution equations for an inelastic plane curve, i.e., a curve whose length i...
Based on the recent work by Andrews and Bryan [2] we present a new proof of the celebrated Grayson's...
We study the evolution of compact convex curves in two-dimensional space forms. The normal speed is ...
summary:The gradient flow of bending energy for plane curve is studied. The flow is considered under...
In this paper, we will investigate a new curvature flow for closed convex plane curves which shorten...
AbstractMotivated by a recent curvature flow introduced by Professor S.-T. Yau [S.-T. Yau, Private c...
We show that any initial closed curve suitably close to a circle flows under length-constrained curv...
The motion of any smooth closed convex curve in the plane in the direction of steepest increase of i...
We consider the evolution of a closed convex hypersurface in euclidean space under a volume preservi...
A recent article [1] considered the so-called \u27ideal curve flow\u27, a sixth-order curvature flow...
2020, Mathematical Sciences Publishers. All rights reserved. We use a gradient flow to deform closed...
In [25], Smoczyk showed that expansion of convex curves and hypersurfaces by the reciprocal of the h...
AbstractThe problem of curve evolution as a function of its local geometry arises naturally in many ...
We consider the evolution of an entire convex graph in euclidean space with speed given by a symmetr...
Wheeler, G. (2013). On the curve diffusion flow of closed plane curves. Annali di Matematica Pura ed...
AbstractWe derive the evolution equations for an inelastic plane curve, i.e., a curve whose length i...
Based on the recent work by Andrews and Bryan [2] we present a new proof of the celebrated Grayson's...
We study the evolution of compact convex curves in two-dimensional space forms. The normal speed is ...
summary:The gradient flow of bending energy for plane curve is studied. The flow is considered under...