The strong Arnol'd chord conjecture for the boundary of a uniformly convex domain in R4
Abstract
Following the idea of Jungsoo Kang and Jun Zhang, we prove the strong Arnol'd chord conjecture for the boundary of a uniformly convex domain in R4, using an ellipsoid embedding construction due to Oliver Edtmair. We prove a general structural result for Legendrians L which are eventually equivariantly essential (E3), in the sense that the kth Gutt-Hutchings capacity ck(D*TL) is infinite for k large enough. We show that any E3 Legendrian in the boundary of a Liouville domain Ω bounds a chord of length at most ck(Ω)/k.
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