## Hamiltonian unknottedness of certain monotone Lagrangian tori in S2× S2

*Cieliebak, Kai*;

*Schwingenheuer, Martin*;

Related identifiers: - Subject: Mathematics - Symplectic Geometry | 53D12
- ddc: ddc:510

arxiv: Mathematics::Geometric Topology | Mathematics::Symplectic Geometry

We prove that a monotone Lagrangian torus in $S^2\times S^2$ which suitably sits in a symplectic fibration with two sections in its complement is Hamiltonian isotopic to the Clifford torus.

- References (9)
- Similar Research Results (11) 11 research results, page 1 of 2
- 1
- 2

publicationOn the classification of certain piecewise linear and differentiable manifolds in dimension eight and automorphisms of $#_{i=1}^b(S^2\times S^5)$ (2002)84%publicationOn Certain Lagrangian Submanifolds of $S^2\times S^2$ and $C P^n$ (2013)82%publicationConcordances from the standard surface in $S^2\times S^2$ (2017)79%publicationKhovanov homology for links in $\#^r(S^2\times S^1)$ (2018)77%publicationBPS spectra and 3-manifold invariants (2017)77%publicationOpen book decompositions versus prime factorizations of closed, oriented 3-manifolds (2014)76%publicationVirtual Black Holes (1995)76%publicationShadows, ribbon surfaces, and quantum invariants (2014)72%publicationOn fillings of homotopy equivalent contact structures (2015)71%publicationOn the Topology of Black Hole Event Horizons in Higher Dimensions (2005)71% - Metrics

Share - Bookmark

- Download from