Some remarks on L-equivalence for cubic fourfolds and hyper-K\"ahler manifolds

Abstract

We prove that if two very general cubic fourfolds are L-equivalent then they are isomorphic, and we observe that there exist special cubic fourfolds which are L-equivalent but not isomorphic. When the cubic fourfolds are very general in certain Hassett divisors, we prove that if they are L-equivalent then they are also Fourier-Mukai partners. We also provide further examples in support of the fact that L-equivalent hyper-K\"ahler manifolds should be D-equivalent, as conjectured by Meinsma.

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