Abstract
Abstract A Kähler-type form is a symplectic form compatible with an integrable complex structure. Let $M$ be either a torus or a K3-surface equipped with a Kähler-type form. We show that the homology class of any Maslov-zero Lagrangian torus in $M$ has to be nonzero and primitive. This extends previous results of Abouzaid and Smith (for tori) and Sheridan and Smith (for K3-surfaces) who proved it for particular Kähler-type forms on $M$. In the K3 case, our proof uses dynamical properties of the action of the diffeomorphism group of $M$ on the space of the Kähler-type forms. These properties are obtained using Shah’s arithmetic version of Ratner’s orbit closure theorem.
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