Congruences of lines in P5, quadratic normality, and completely exceptional Monge-Amp\`ere equations
Abstract
The existence is proved of two new families of locally Cohen-Macaulay sextic threefolds in P5, which are not quadratically normal. These threefolds arise naturally in the realm of first order congruences of lines as focal loci and in the study of the completely exceptional Monge-Amp\`ere equations. One of these families comes from a smooth congruence of multidegree (1,3,3) which is a smooth Fano fourfold of index two and genus 9.
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