On a conjecture on Hodge loci of linear combinations of linear subvarieties

Abstract

For each k ≥ 5 we give a counterexample to a conjecture of Movasati on the dimension of certain Hodge loci of cubic hypersurfaces in P2k+1 containing two k-planes intersecting in dimension k-3. We give similar examples for Hodge loci of cubic hypersurfaces in P2k+1 containing two k-planes intersecting in dimension k-2 and for quartic hypersurfaces in P2k+1 containing two k-planes intersecting in dimension k-2. Moreover, we present new evidence for Movasati's conjecture for the values of k for which our type of counterexamples cannot exist, i.e., for k=3,4.

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