Relating second order geometry of manifolds through projections and normal sections

Pedro Benedini Riul; Raúl Oset Sinha

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Relating second order geometry of manifolds through projections and normal sections

Autores: Pedro Benedini Riul, Raúl Oset Sinha
Localización: Publicacions matematiques, ISSN 0214-1493, Vol. 65, Nº 1, 2021, págs. 389-407
Idioma: inglés
DOI: 10.5565/publicacionsmatematiques.v65i1.384546
Enlaces
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Resumen
- We use normal sections to relate the curvature locus of regular (resp. singular corank 1) 3-manifolds in R6 (resp. R5) with regular (resp. singular corank 1) surfaces in R5 (resp. R4 ). For example, we show how to generate a Roman surface by a family of ellipses different to Steiner’s way. We also study the relations between the regular and singular cases through projections. We show that there is a commutative diagram of projections and normal sections which relates the curvature loci of the different types of manifolds, and therefore, that the second order geometry of all of them is related. In particular, we define asymptotic directions for singular corank 1 3-manifolds in R5 and relate them to asymptotic directions of regular 3-manifolds in R6 and singular corank 1 surfaces in R4.
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