Smooth Projective Symmetric Varieties With Picard Number One

Ruzzi, Alessandro

doi:10.1142/s0129167x11005678

Cited by 17 publications

(28 citation statements)

References 18 publications

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“…Now, we verify the smoothness of such varieties. First, we explain the conditions for a projective locally factorial symmetric variety X with rank two to be smooth (see [Ru07], Theorems 2.1 and 2.2). Let Y be a open simple Gsubvariety of X whose closed orbit is compact; then the associated colored cone (C, F ) has dimension two.…”

Section: (Quasi) Fano Symmetric Varieties Of Rank 2 51 Fano Symmetrimentioning

confidence: 99%

Fano Symmetric Varieties with Low Rank

Ruzzi¹

2012

Publ. Res. Inst. Math. Sci.

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The symmetric projective varieties of rank one are all smooth and Fano by a classic result of Akhiezer. We classify the locally factorial (respectively smooth) projective symmetric G-varieties of rank 2 which are Fano. When G is semisimple we classify also the locally factorial (respectively smooth) projective symmetric G-varieties of rank 2 which are only quasi-Fano. Moreover, we classify the Fano symmetric G-varieties of rank 3 obtainable from a wonderful variety by a sequence of blow-ups along G-stable varieties. Finally, we classify the Fano symmetric varieties of arbitrary rank which are obtainable from a wonderful variety by a sequence of blow-ups along closed orbits.

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Section: (Quasi) Fano Symmetric Varieties Of Rank 2 51 Fano Symmetrimentioning

confidence: 99%

Fano Symmetric Varieties with Low Rank

Ruzzi¹

2012

Publ. Res. Inst. Math. Sci.

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“…In particular the standard completion of any symmetric space is Q-factorial. The conditions for the smoothness are much more complicated (see [Ru07], Theorem 2.2). Notice that the most part of this section is true for any spherical variety: in particular the descriptions of the class group and of the Picard group holds in general.…”

Section: Notationmentioning

confidence: 99%

Effective and big divisors on a projective symmetric variety

Ruzzi¹

2012

Journal of Algebra

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“…To prove Theorem 3.6, we will make use of a characterization of smoothness for arbitrary group compactifications given by D. Timashev in [12]. For convenience, we will use a generalization of it which can be found in [10] in the more general context of symmetric spaces. We recall it in the case of a simple group compactification.…”

Section: Smoothnessmentioning

confidence: 99%

“…In [10], it is proved that when X λ is normal then Z λ also is normal. The converse of this result does not hold in general.…”

Section: Normality Of X λ and The Closure Of A Maximal Torus Orbitmentioning

confidence: 99%