Centro-affine hypersurface immersions with parallel cubic form
Roland Hildebrand
TL;DR
This paper classifies centro-affine hypersurfaces with parallel cubic form using Jordan algebra theory, establishing a correspondence with conic omega-domains and affine hyperspheres, and extends to broader Jordan algebra contexts.
Contribution
It provides a complete classification of such hypersurfaces via semi-simple Jordan algebras and links them to omega-domains and affine hyperspheres.
Findings
Bijective correspondence with omega-domains and affine hyperspheres.
Complete classification based on semi-simple Jordan algebras.
Extension to hypersurfaces related to real unital Jordan algebras.
Abstract
We consider non-degenerate centro-affine hypersurface immersions in R^n whose cubic form is parallel with respect to the Levi-Civita connection of the affine metric. There exists a bijective correspondence between homothetic families of proper affine hyperspheres with center in the origin and with parallel cubic form, and K\"ochers conic omega-domains, which are the maximal connected sets consisting of invertible elements in a real semi-simple Jordan algebra. Every level surface of the omega function in an omega-domain is an affine complete, Euclidean complete proper affine hypersphere with parallel cubic form and with center in the origin. On the other hand, every proper affine hypersphere with parallel cubic form and with center in the origin can be represented as such a level surface. We provide a complete classification of proper affine hyperspheres with parallel cubic form based on…
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Taxonomy
TopicsHomotopy and Cohomology in Algebraic Topology · Algebraic and Geometric Analysis · Holomorphic and Operator Theory