Katsuhisa Furukawa
Published 2013-10-21, updated 2015-06-30Version 4
A general fiber of the Gauss map of a projective variety in $\mathbb{P}^N$ coincides with a linear subvariety of $\mathbb{P}^N$ in characteristic zero. In positive characteristic, S. Fukasawa showed that a general fiber of the Gauss map can be a non-linear variety. In this paper, we show that each irreducible component of such a possibly non-linear fiber of the Gauss map is contracted to one point by the degeneracy map, and is contained in a linear subvariety corresponding to the kernel of the differential of the Gauss map. We also show the inseparability of Gauss maps of strange varieties not being cones.
On Gauss maps in positive characteristic in view of images, fibers, and field extensions
Gauss maps of toric varieties
Characterizations of ${\mathbb P}^n$ in arbitrary characteristic
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