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Mathematical Research Letters
Volume 28 (2021)
Number 6
The double Cayley Grassmannian
Pages: 1765 – 1792
Author
Abstract
We study the smooth projective symmetric variety of Picard number one that compactifies the exceptional complex Lie group $G_2$, by describing it in terms of vector bundles on the spinor variety of $\mathit{Spin}_{14}$. We call it the double Cayley Grassmannian because quite remarkably, it exhibits very similar properties to those of the Cayley Grassmannian (the other symmetric variety of type $G_2$), but doubled in a certain sense. We deduce among other things that all smooth projective symmetric varieties of Picard number one are infinitesimally rigid
Received 14 August 2020
Accepted 10 June 2021
Published 29 August 2022