Infinitely many monotone Lagrangian tori in higher projective spaces
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Vianna constructed infinitely many exotic Lagrangian tori in the complex projective plane. We lift these tori to higher-dimensional projective spaces and show that they remain non-symplectomorphic. Our proof is elementary except for an application of the wall-crossing formula by Pascaleff-Tonkonog.
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Cited by 2 Pith papers
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Existence of pseudo-holomorphic disks via non-archimedean disk potentials
Existence of Maslov index 2 pseudo-holomorphic disks for isotoped monotone Lagrangians is established using a non-archimedean analytic disk potential invariant.
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Augmentation varieties and disk potentials III
Establishes equality between augmentation varieties and disk potential zero sets for Legendrian covers of monotone tori in circle-fibered contact manifolds, with applications to non-isotopy and non-fillability.
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