6533b86efe1ef96bd12cb626
RESEARCH PRODUCT
Critical points of higher order for the normal map of immersions in Rd
M.g. MoneraEsther Sanabria-codesalS.m. MoraesA. Montesinos-amilibiasubject
Focal setImage (category theory)Mathematical analysisCritical pointsStrong principal directionsSubmanifoldCombinatoricsNormal mapNormal bundleNormal mappingOrder (group theory)Geometry and TopologyVeronese of curvatureEllipse of curvatureMATEMATICA APLICADAMathematicsdescription
We study the critical points of the normal map v : NM -> Rk+n, where M is an immersed k-dimensional submanifold of Rk+n, NM is the normal bundle of M and v(m, u) = m + u if u is an element of NmM. Usually, the image of these critical points is called the focal set. However, in that set there is a subset where the focusing is highest, as happens in the case of curves in R-3 with the curve of the centers of spheres with contact of third order with the curve. We give a definition of r-critical points of a smooth map between manifolds, and apply it to study the 2 and 3-critical points of the normal map in general and the 2-critical points for the case k = n = 2 in detail. In the later case we analyze the relation with the strong principal directions of Montaldi (1986) [2]. (C) 2011 Elsevier B.V. All rights reserved.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2012-02-01 | Topology and its Applications |