On the large-scale geometry of domains in an exact symplectic 4-manifold
We show that the space of open subsets of any complete and exact symplectic \(4\)-manifold has infinite dimension with respect to the symplectic Banach-Mazur distance; the quasi-flats we construct take values in the set of dynamically convex domains. In the case of \(\mathbb{R}^4\), we therefore obt...
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Veröffentlicht in: | arXiv.org 2023-11 |
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Format: | Artikel |
Sprache: | eng |
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Zusammenfassung: | We show that the space of open subsets of any complete and exact symplectic \(4\)-manifold has infinite dimension with respect to the symplectic Banach-Mazur distance; the quasi-flats we construct take values in the set of dynamically convex domains. In the case of \(\mathbb{R}^4\), we therefore obtain the following contrast: the space of convex domains is quasi-isometric to a plane, while the space of dynamically convex ones has infinite dimension. In the case of \(T^* S^2\), a variant of our construction resolves a conjecture of Stojisavljevi\'{c} and Zhang, asserting that the space of star-shaped domains in \(T^* S^2\) has infinite dimension. Another corollary is that the space of contact forms giving the standard contact structure on \(S^3\) has infinite dimension with respect to the contact Banach-Mazur distance. |
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ISSN: | 2331-8422 |