Extendability of general K3 surfaces without Gaussian maps and classification of non-prime Fano threefolds

Abstract

In arXiv:2409.03960, we introduced an approach to the question of extendability of projective varieties via degeneration to ribbons. In this article we build on these methods to give a new proof of optimal results on the extendability of general non-prime K3 surfaces, classification of non-prime Fano threefolds and Mukai varieties and the irreducibility of their Hilbert schemes. The methods in this article also show the non-extendability of prime K3 surfaces for infinitely many values of g, for example when g is of the form g = 4k+1, k ≥ 5. This involves degenerations of K3 surfaces to ribbons on embedded Hirzebruch surfaces, called K3 carpets. We directly give optimal upper bounds on the cohomology of the twisted normal bundle of the K3 carpets instead of computing coranks of Gaussian maps of the canonical curve sections. As a result of independent interest, we show such K3 carpets also appear as degenerations of smoothable simple normal crossings of two Hirzebruch surfaces embedded by arbitrary linear series intersecting along an anticanonical elliptic curve. Such type II degenerations constitute a smooth locus of codimension 6 in the Hilbert scheme of K3 surfaces.

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