Pfaffian Cubic Fourfolds and non-trivial Brauer Classes
 
Michele Bolognesi (Université de Rennes 1)



In this talk I will showcase a general class of smooth rational cubic fourfolds X containing a plane whose associated quadric surface bundle does not have a rational section. Equivalently, the Brauer class B of the even Clifford algebra over the discriminant cover (a K3 surface S of degree 2) associated to the quadric bundle, is nontrivial. These fourfolds provide nontrivial examples verifying Kuznetsov's conjecture on the rationality of cubic fourfolds containing a plane. I will then explore the connections between this construction and the existence of one-apparent-double-point surfaces inside the cubic 4-fold.



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