Click here to flash read.
arXiv:2404.16311v1 Announce Type: new
Abstract: We prove that Bourgeois' contact structures on $M \times \mathbb{T}^{2}$ determined by the supporting open books of a contact manifold $(M, \xi)$ are always tight. The proof is based on a contact homology computation leveraging holomorphic foliations and Kuranishi structures.
Click here to read this post out
ID: 823031; Unique Viewers: 0
Unique Voters: 0
Total Votes: 0
Votes:
Latest Change: April 26, 2024, 7:32 a.m.
Changes:
Dictionaries:
Words:
Spaces:
Views: 12
CC:
No creative common's license
No creative common's license
Comments: