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On linking of Lagrangian tori in $\mathbb{R}^4$ (1806.07853v2)
Published 20 Jun 2018 in math.SG
Abstract: We prove some results about linking of Lagrangian tori in the symplectic vector space $(\mathbb{R}4, \omega)$. We show that certain enumerative counts of holomophic disks give useful information about linking. This enables us to prove, for example, that any two Clifford tori are unlinked in a strong sense. We extend work of Dimitroglou Rizell and Evans on linking of monotone Lagrangian tori to a class of non-monotone tori in $\mathbb{R}4$ and also strengthen their conclusions in the monotone case in $\mathbb{R}4$.