On Singularities of the Gauss Map Components of Surfaces in R4

The Gauss map of a generic immersion of a smooth, oriented surface into R 4 is an immersion. But this map takes values on the Grassmanian of oriented 2-planes in R 4 . Since this manifold has a structure of a product of two spheres, the Gauss map has two components that take values on the sphere. We...

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Published inThe Journal of geometric analysis Vol. 34; no. 6
Main Authors Domitrz, Wojciech, Hernández-Martínez, Lucía Ivonne, Sánchez-Bringas, Federico
Format Journal Article
LanguageEnglish
Published New York Springer US 01.06.2024
Springer Nature B.V
Subjects
Abstract Harmonic Analysis
Convex and Discrete Geometry
Differential Geometry
Dynamical Systems and Ergodic Theory
Fourier Analysis
Global Analysis and Analysis on Manifolds
Mathematics
Mathematics and Statistics
Singularity (mathematics)
Submerging
Topology
Gauss map
53C42
58K30
Gauss–Bonnet formulas
Singularities
Surfaces
58K05
53A05
58K25
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Summary:The Gauss map of a generic immersion of a smooth, oriented surface into R 4 is an immersion. But this map takes values on the Grassmanian of oriented 2-planes in R 4 . Since this manifold has a structure of a product of two spheres, the Gauss map has two components that take values on the sphere. We study the singularities of the components of the Gauss map and relate them to the geometric properties of the generic immersion. Moreover, we prove that the singularities are generically stable, and we connect them to the contact type of the surface and J -holomorphic curves with respect to an orthogonal complex structure J on R 4 . Finally, we get some formulas of Gauss–Bonnet type involving the geometry of the singularities of the components with the geometry and topology of the surface.
ISSN:1050-6926
1559-002X
DOI:10.1007/s12220-024-01616-7