We study the geometry of the secant and tangential variety of a cominuscule
and minuscule variety, e.g. a Grassmannian or a spinor variety. Using methods
inspired by statistics we provide an explicit local isomorphism with a product
of an affine space with a variety which is the Zariski closure of the image of
a map defined by generalized determinants. In particular, equations of the
secant or tangential variety correspond to relations among generalized
determinants. We also provide a representation theoretic decomposition of
cubics in the ideal of the secant variety of any Grassmannian

Laurent Manivel

Mateusz

Micha Lek

Linear Algebra and its Applications

English

arXiv

International audienceWe study the geometry of the secant and tangential variety of a cominuscule and minuscule variety, e.g. a Grassmannian or a spinor variety. Using methods inspired by statistics we provide an explicit local isomorphism with a product of an affine space with a variety which is the Zariski closure of the image of a map defined by generalized determinants. In particular, equations of the secant or tangential variety correspond to relations among generalized determinants. We also provide a representation theoretic decomposition of cubics in the ideal of the secant variety of any Grassmannian

Michalek, Mateusz, Michalek

Manivel, Laurent

HAL: Hyper Article en Ligne

Secants of minuscule and cominuscule minimal orbits

Manivel, L.

Michałek, M.

MPG.PuRe

Mateusz Michałek

Crossref

Mateusz Michalek

CiteSeerX

SECANTS OF MINUSCULE AND COMINUSCULE MINIMAL ORBITS

HAL AMU

Hal - Université Grenoble Alpes

Secants of minuscule and cominuscule minimal orbits

Abstract

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