Projective Degenerations of K3 Surfaces, Gaussian Maps, and Fano Threefolds
Abstract
In this article we exhibit certain projective degenerations of smooth K3 surfaces of degree 2g-2 in Pg (whose Picard group is generated by the hyperplane class), to a union of two rational normal scrolls, and also to a union of planes. As a consequence we prove that the general hyperplane section of such K3 surfaces has a corank one Gaussian map, if g=11 or g≥ 13. We also prove that the general such hyperplane section lies on a unique K3 surface, up to projectivities. Finally we present a new approach to the classification of prime Fano threefolds of index one, which does not rely on the existence of a line.
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