On projective toric varieties whose defining ideals have minimal generators of the highest degree

Shoetsu Ogata

Displaying similar documents to “On projective toric varieties whose defining ideals have minimal generators of the highest degree”

Toric hyperkähler varieties.

Hausel, Tamás, Sturmfels, Bernd (2002)

Documenta Mathematica

Similarity:

Degeneration of Schubert varieties of $S L_{n} / B$ to toric varieties

Raika Dehy, Rupert W.T. Yu (2001)

Annales de l’institut Fourier

Similarity:

Using the polytopes defined in an earlier paper, we show in this paper the existence of degeneration of a large class of Schubert varieties of $S L_{n}$ to toric varieties by extending the method used by Gonciulea and Lakshmibai for a miniscule $G / P$ to Schubert varieties in $S L_{n}$ .

Equations defining Schubert varieties and Frobenius splittings of diagonals

A. Ramanathan (1987)

Publications Mathématiques de l'IHÉS

Similarity:

On the class of some projective varieties.

Edoardo Ballico, Marina Bertolini, Cristina Turrini (1997)

Collectanea Mathematica

Similarity:

Some inequalities between the class and the degree of a smooth complex projective manifold are given. Application to the case of low sectional genus are supplied.

Higher order duality and toric embeddings

Alicia Dickenstein, Sandra Di Rocco, Ragni Piene (2014)

Annales de l’institut Fourier

Similarity:

The notion of higher order dual varieties of a projective variety, introduced by Piene in 1983, is a natural generalization of the classical notion of projective duality. In this paper we study higher order dual varieties of projective toric embeddings. We express the degree of the second dual variety of a 2-jet spanned embedding of a smooth toric threefold in geometric and combinatorial terms, and we classify those whose second dual variety has dimension less than expected. We also...

On projective degenerations of Veronese spaces

Edoardo Ballico (1996)

Banach Center Publications

Similarity:

Here we give several examples of projective degenerations of subvarieties of $ℙ^{t}$ . The more important case considered here is the d-ple Veronese embedding of $ℙ^{n}$ ; we will show how to degenerate it to the union of $d^{n}$ n-dimensional linear subspaces of $ℙ^{t}; t : = (n + d) / (n! d!) - 1$ and the union of scrolls. Other cases considered in this paper are essentially projective bundles over important varieties. The key tool for the degenerations is a general method due to Moishezon. We will give elsewhere several applications to...

Jumping deformations of complete toric varieties.

Sato, Hiroshi (2003)

International Journal of Mathematics and Mathematical Sciences

Similarity:

Generalized polar varieties and an efficient real elimination

Bernd Bank, Marc Giusti, Joos Heintz, Luis M. Pardo (2004)

Kybernetika

Similarity:

Let $W$ be a closed algebraic subvariety of the $n$ -dimensional projective space over the complex or real numbers and suppose that $W$ is non-empty and equidimensional. In this paper we generalize the classic notion of polar variety of $W$ associated with a given linear subvariety of the ambient space of $W$ . As particular instances of this new notion of generalized polar variety we reobtain the classic ones and two new types of polar varieties, called dual and (in case that $W$ is affine) conic....