A nonpolynomially convex isotropic two-torus with no attached discs
Abstract
We show --- with the means of a real-analytic example in C3 --- that Gromov's theorem on the presence of attached holomorphic discs for compact Lagrangian manifolds is not true in the isotropic (subcritical) case, even in the absence of an obvious obstruction, i.e, polynomial convexity.
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