Add to ORKGThe study of geometric flows for smoothing, multiscale representation, and analysis of two and three dimensional objects has received much attention in the past few years. In this paper, we first present results mainly related to Euclidean invariant geometric smoothing of three dimensional surfaces. We describe results concerning the smoothing of graphs (images) via level sets of geometric heat-type flows. Then we deal with proper three dimensional flows. These flows are governed by functions of the principal curvatures of the surface, such as the mean and Gaussian curvatures. Then, given a transformation group G acting on Rn, we write down a general expression for any G-invariant hypersurface geometric evolution in R n. As an application, ...
The mean curvature flow arises material science and condensed matter physics and has been recently s...
We study hypersurfaces in Riemannian manifolds moving in normal direction with a speed depending on ...
This article extends the analysis developed by Giona and Adrover [M. Giona, A. Adrover, Phys. Rev. L...
Includes bibliographical references (p. 21-25).Supported by the National Science Foundation. DMS-911...
In this paper we present a geometric smoothing technique for three-dimensional surfaces and images. ...
©1994 IEEE. Personal use of this material is permitted. However, permission to reprint/republish thi...
In many areas of computer vision, such as multiscale analysis and shape description, an image or sur...
©1993 SPIE--The International Society for Optical Engineering. One print or electronic copy may be m...
A geometric evolution equation is a partial differential equation that evolves some kind of geometri...
We propose a geometric smoothing method based on local curvature in shapes and images which is gover...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
Includes bibliographical references (p. 40-44).Supported by the National Science Foundation. DMS-920...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
A scale space for images painted on surfaces is introduced. Based on the geodesic curvature flow of ...
The mean curvature flow arises material science and condensed matter physics and has been recently s...
We study hypersurfaces in Riemannian manifolds moving in normal direction with a speed depending on ...
This article extends the analysis developed by Giona and Adrover [M. Giona, A. Adrover, Phys. Rev. L...
Includes bibliographical references (p. 21-25).Supported by the National Science Foundation. DMS-911...
In this paper we present a geometric smoothing technique for three-dimensional surfaces and images. ...
©1994 IEEE. Personal use of this material is permitted. However, permission to reprint/republish thi...
In many areas of computer vision, such as multiscale analysis and shape description, an image or sur...
©1993 SPIE--The International Society for Optical Engineering. One print or electronic copy may be m...
A geometric evolution equation is a partial differential equation that evolves some kind of geometri...
We propose a geometric smoothing method based on local curvature in shapes and images which is gover...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
Includes bibliographical references (p. 40-44).Supported by the National Science Foundation. DMS-920...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
A scale space for images painted on surfaces is introduced. Based on the geodesic curvature flow of ...
The mean curvature flow arises material science and condensed matter physics and has been recently s...
We study hypersurfaces in Riemannian manifolds moving in normal direction with a speed depending on ...
This article extends the analysis developed by Giona and Adrover [M. Giona, A. Adrover, Phys. Rev. L...