English

Homogeneous projective varieties with semi-continuous rank function

Algebraic Geometry 2015-04-07 v3 Representation Theory

Abstract

Let XP(V)\mathbb X\subset\mathbb P(V) be a projective variety, which is not contained in a hyperplane. Then every vector vv in VV can be written as a sum of vectors from the affine cone XX over X\mathbb X. The minimal number of summands in such a sum is called the rank of vv. The set of vectors of rank rr is denoted by XrX_r and its projective image by Xr\mathbb X_r. The r-th secant variety of XX is defined σr(X):=srXsˉ\sigma_r(\mathbb X):=\bar{\sqcup_{s\le r}\mathbb X_s}; it is called tame if σr(X)=srXs\sigma_r(\mathbb X)=\sqcup_{s\le r} \mathbb X_s and wild if the closure contains elements of higher rank. In this paper, we classify all equivariantly embedded homogeneous projective varieties XP(V)\mathbb X\subset\mathbb P(V) with tame secant varieties. Classical examples are: the variety of rank one matrices (Segre variety with two factors) and the variety of rank one quadratic forms (quadratic Veronese variety). In the general setting, X\mathbb X is the orbit in P(V)\mathbb P(V) of a highest weight line in an irreducible representation VV of a reductive algebraic group GG. Thus, our result is a list of all irreducible representations of reductive groups, where the resulting X\mathbb X has tame secant varieties.

Keywords

Cite

@article{arxiv.1304.3322,
  title  = {Homogeneous projective varieties with semi-continuous rank function},
  author = {A. Petukhov and V. Tsanov},
  journal= {arXiv preprint arXiv:1304.3322},
  year   = {2015}
}

Comments

Final published version. Title changed from previous "Homogeneous projective varieties with tame secant varieties"

R2 v1 2026-06-21T23:58:02.827Z