Key varieties for prime Q-Fano threefolds defined by Jordan algebras of cubic forms. Part I

Abstract

We construct a 13-dimensional affine variety HA13 associated with P2×P2-fibrations of relative Picard number 1. The construction is modelled on the fact that the affine cone over the Segre-embedded P2×P2 is the null locus of the -map of the 9-dimensional nondegenerate quadratic Jordan algebra J of a cubic form. Using three fixed complementary primitive idempotents and the Peirce decomposition, we coordinatize J by 8 parameters and thereby obtain HA13. We then produce complex prime Q-Fano 3-folds, anticanonically embedded of codimension 4, as weighted complete intersections in suitable weighted projectivizations of HA13, in its subvarieties, or in their weighted cones (allowing some coordinates of weight 0). We refer to HA13 and these projectivizations as key varieties for prime Q-Fano 3-folds. As an application, we show that a prime Q-Fano 3-fold of genus 3 with three 1/2(1,1,1)-singularities of type No.,5.4 as in Tak1 arises as a linear section of a weighted projectivization of HA13 with all coordinates of positive weight, and conversely any such threefold is obtained in this way. Moreover, relating HA13 to the C2-cluster variety of Coughlan--Ducat CD1, we show that weighted projectivizations of HA13 or of its subvarieties serve as key varieties for prime Q-Fano 3-folds belonging to 108 classes in the online database GRDB.