New proofs for technical results in "Infinitesimal invariants of mixed Hodge structures'' (arXiv:2406.17118v1)

Abstract

Cubic forms C are constructed in the work of R. Aguilar, M. Green and P. Griffiths to establish the generic global Torelli theorem for Fano-K3 pairs (X,Y), where X: F=0 is a cubic threefold in P4 and Y∈|-KX| is an anticanonical smooth section of X defined by a quadratic form Q. In this article, we prove the following two results, which were previously verified with the computer aid of Macaulay2: for a generic pair (X,Y), (i) the cubic form C is smooth; (2) (JF,3:Q)=0, and thereby give a precise meaning of the word ``generic" in this context.