Projective invariants of CR-hypersurfaces
C. Hammond, C. Robles
TL;DR
This paper investigates the classification of CR-hypersurfaces in complex projective space using projective differential invariants, characterizing self-dual strongly C-linearly convex hypersurfaces and providing a complete set of invariants.
Contribution
It introduces a complete set of projective differential invariants for CR-hypersurfaces and characterizes self-dual strongly C-linearly convex hypersurfaces.
Findings
Complete set of projective invariants provided
Characterization of self-dual strongly C-linearly convex hypersurfaces
Advances classification under projective transformations
Abstract
We study the equivalence problem under projective transformation for CR-hypersurfaces of complex projective space. A complete set of projective differential invariants for analytic hypersurfaces is given. The self-dual strongly C-linearly convex hypersurfaces are characterized.
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Taxonomy
TopicsHolomorphic and Operator Theory · Algebraic and Geometric Analysis · Meromorphic and Entire Functions