CORNER ENHANCEMENT IN CURVATURE SCALE SPACE

This paper shows the application of the discrete scale-space kernel T(n;t) with continuous parameter to scale-space analysis of digital curves. The numerical problems that arise in the implementation are addressed in sequence and feasible solutions are proposed. The scale-space analysis is applied t

geodesic curvature flow, the embedding property is preserved and the evolving curve exists for all times and either A scale space for images painted on surfaces is introduced. Based on the geodesic curvature flow of the iso-gray level conbecomes a geodesic or shrinks into a point. We will limit tour

Concepts for curvature of arcs in metric geometry (specifically, Menger curvature KM, Haantjes-Finsler curvature Kn, and transverse curvature '~r introduced earlier by the author) are compared with respect to existence and numerical values. If a metric space satisfies a certain metric inequality sha