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This article is cited in 1 scientific paper (total in 1 paper)
Lagrangian Grassmannians and Spinor Varieties in Characteristic Two
Bert van Geemena, Alessio Marranibcd a Dipartimento di Matematica, Università di Milano, Via Saldini 50, I-20133 Milano, Italy
b Museo Storico della Fisica e Centro Studi e Ricerche Enrico Fermi,
Via Panisperna 89A, I-00184, Roma, Italy
c INFN, sezione di Padova, Via Marzolo 8, I-35131 Padova, Italy
d Dipartimento di Fisica "Galileo Galilei", Università degli studi di Padova, I-35131 Padova, Italy
Abstract:
The vector space of symmetric matrices of size $n$ has a natural map to a projective space of dimension $2^n-1$ given by the principal minors. This map extends to the Lagrangian Grassmannian ${\rm LG}(n,2n)$ and over the complex numbers the image is defined, as a set, by quartic equations. In case the characteristic of the field is two, it was observed that, for $n=3,4$, the image is defined by quadrics. In this paper we show that this is the case for any $n$ and that moreover the image is the spinor variety associated to ${\rm Spin}(2n+1)$. Since some of the motivating examples are of interest in supergravity and in the black-hole/qubit correspondence, we conclude with a brief examination of other cases related to integral Freudenthal triple systems over integral cubic Jordan algebras.
Keywords:
Lagrangian Grassmannian, spinor variety, characteristic two, Freudenthal triple system.
Received: March 8, 2019; in final form August 21, 2019; Published online August 27, 2019
Citation:
Bert van Geemen, Alessio Marrani, “Lagrangian Grassmannians and Spinor Varieties in Characteristic Two”, SIGMA, 15 (2019), 064, 22 pp.
Linking options:
https://www.mathnet.ru/eng/sigma1500 https://www.mathnet.ru/eng/sigma/v15/p64
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