On the agreement of symplectic capacities in high dimension
A theorem of Gutt-Hutchings-Ramos asserts that all normalized symplectic capacities give the same value for monotone four-dimensional toric domains. We generalize this theorem to arbitrary dimension. The new ingredient in our proof is the construction of symplectic embeddings of "$L$-shaped&quo...
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Zusammenfassung: | A theorem of Gutt-Hutchings-Ramos asserts that all normalized symplectic
capacities give the same value for monotone four-dimensional toric domains. We
generalize this theorem to arbitrary dimension. The new ingredient in our proof
is the construction of symplectic embeddings of "$L$-shaped" domains in any
dimension into corresponding infinite cylinders; this resolves a conjecture of
Gutt-Pereira-Ramos in the affirmative. |
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DOI: | 10.48550/arxiv.2307.12125 |