Abstract
The Tango bundle $T$ over $\p ^5$ is proved to be the pull--back of the twisted Cayley bundle $C(1)$ via a map $f \colon \p ^5 \rightarrow Q_5$ existing only in characteristic 2. The Frobenius morphism $\varphi$ factorizes via such $f$.
Citation
Daniele Faenzi. "A geometric construction of Tango bundle on $\p^5$." Kodai Math. J. 27 (1) 1 - 6, March 2004. https://doi.org/10.2996/kmj/1085143785
Information