Your search keyword '"Projectively dual variety"' showing total 2 results

1. Singularities of duals of Grassmannians

Author

Holweck, Frédéric

Subjects

*GRASSMANN manifolds, *MATHEMATICAL singularities, *DUALITY theory (Mathematics), *ALGEBRAIC geometry, *ALGEBRAIC varieties, *REPRESENTATIONS of algebras, *LIE algebras, *DETERMINANTS (Mathematics)

Abstract

Abstract: Let be a smooth irreducible nondegenerate projective variety and let denote its dual variety. The locus of bitangent hyperplanes, i.e. hyperplanes tangent to at least two points of X, is a component of the singular locus of . In this paper we provide a sufficient condition for this component to be of maximal dimension and show how it can be used to determine which dual varieties of Grassmannians are normal. That last part may be compared to what has been done for hyperdeterminants by J. Weyman and A. Zelevinsky (1996) in . [Copyright &y& Elsevier]

Published

2011

2. Singularities of duals of Grassmannians

Author

Frédéric Holweck

Subjects

Mathematics - Differential Geometry, Pure mathematics, Algebra and Number Theory, Grassmannian, Hyperdeterminant, Second fundamental form, Singular locus, Representation of semi-simple Lie algebras, Projectively dual variety, Algebraic geometry, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Secant varieties, Hyperplane, 14M15, 53A20, 20G05, Dual polyhedron, Locus (mathematics), Mathematics::Representation Theory, Mathematics - Representation Theory, Projective variety, Bitangent, Mathematics

Abstract

Let $X$ be a smooth irreducible nondegenerate projective variety and let $X^*$ denote its dual variety. It is well known that $\sigma_2(X)^*$, the dual of the 2-secant variety of $X$, is a component of the singular locus of $X^*$. The locus of bitangent hyperplanes, i.e. hyperplanes tangent to at least two points of $X$, is a component of the sigular locus of $X^*$. In this paper we provide a sufficient condition for this component to be of maximal dimension and show how it can be used to determine which dual varieties of Grassmannians are normal. That last part may be compared to what has been done for hyperdeterminants by J. Weyman and A. Zelevinski (1996)., Comment: 14 pages, appeared in Journal of Algebra (2011)

Published

2011