Geometrical description of smooth projective symmetric varieties with Picard number one

Abstract: In [Ru2] we have classified the smooth projective symmetric G-varieties with Picard number one (and G semisimple). In this work we give a geometrical description of such varieties. In particular, we determine their group of automorphisms. When this group, Aut(X), acts non-transitively on X, we describe a G-equivariant embedding of the variety X in a homogeneous variety (with respect to a larger group).keywords: Symmetric varieties, Fano varieties. Mathematics Subject Classification 2000: 14M17, 14J45, 14L30A G… Show more

“…Fano symmetric varieties of Picard number one. Ruzzi proved in [17] that there exist exactly six smooth projective symmetric varieties of Picard number one which are not homogeneous. One of them is a completion of G 2 , considered as the symmetric space (G 2 × G 2 )/G 2 .…”

“…Moreover we can identify ∆ 8 with ∧ • A and ∆ ′ 8 with ∧ • A ′ , where A = e 1 , e 2 , e 3 and A ′ = e 4 , e 5 , e 6 . Now, the restriction of ∆ 7 to G 2 decomposes as C ⊕ V 7 , so that finally [17] is that DG is the (highly non transverse) intersection of…”

The Cayley Grassmannian

“…Fano symmetric varieties of Picard number one. Ruzzi proved in [17] that there exist exactly six smooth projective symmetric varieties of Picard number one which are not homogeneous. One of them is a completion of G 2 , considered as the symmetric space (G 2 × G 2 )/G 2 .…”

“…Moreover we can identify ∆ 8 with ∧ • A and ∆ ′ 8 with ∧ • A ′ , where A = e 1 , e 2 , e 3 and A ′ = e 4 , e 5 , e 6 . Now, the restriction of ∆ 7 to G 2 decomposes as C ⊕ V 7 , so that finally [17] is that DG is the (highly non transverse) intersection of…”

The Cayley Grassmannian

“…Indeed, while W ⊕ C1 is a composition algebra if W is in the open G 2 -orbit, when W is in the closed G 2 -orbit, W ⊕ C1 is isomorphic to the exterior algebra * C 2 of C 2 . In particular, the proof of Proposition 1, §2.2 of [13] holds if one deletes the last line.…”

“…In Theorem 2 of [13] it is said that "the smooth completion X of G 2 /(SL 2 ×SL 2 ) with P ic(X) = Z parametrizes the subspaces W of C 7 such that W ⊕ C1 is a subalgebra of O C isomorphic to the complexified quaternions." I would to thank P. Chaput which pointed to me that I have only proved that X parametrizes the subspace such that W ⊕ C1 is an associative subalgebra of O C of dimension four.…”

“…In [13], we give a geometrical description of these varieties; in particular, we determine their group of automorphism. Moreover, if the action of this last group is not transitive, then the variety is a linear section of a generalized flag variety and it is lied to exceptional groups.…”

Smooth Projective Symmetric Varieties With Picard Number One

On the Geometry of Spherical Varieties