Symplectic isotopy classes of ellipsoids and polydisks in dimension greater than four
classification
🧮 math.SG
keywords
dimensionembeddingssymplecticballcertainclassesconnectedellipsoid
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In any dimension $2n \ge 6$ we show that certain spaces of symplectic embeddings of a polydisk into a product $B^4 \times \Bbb R^{2(n-2)}$ of a $4$-ball and Euclidean space, are not path connected. We also show that any pair of such nonisotopic embeddings can never be extended to the same ellipsoid.
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