Leopold Zoller scite author profile

Using the classification of 6-dimensional manifolds by Wall, Jupp andŽubr, we observe that the diffeomorphism type of simply-connected, compact 6-dimensional integer GKM T 2 -manifolds is encoded in their GKM graph. As an application, we show that the 6-dimensional manifolds on which Tolman and Woodward constructed Hamiltonian, non-Kähler T 2 -actions with finite fixed point set are both diffeomorphic to Eschenburg's twisted flag manifold SU(3)//T 2 . In particular, they admit a noninvariant Kähler structure.

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Symplectic and Kähler structures on biquotients

Goertsches¹,

Konstantis²,

Zoller³

2018

Preprint

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We construct symplectic structures on roughly half of all equal rank biquotients of the form G//T , where G is a compact simple Lie group and T a torus, and investigate Hamiltonian Lie group actions on them. For the Eschenburg flag, this action has similar properties as Tolman's and Woodward's examples of Hamiltonian non-Kähler actions. In addition to the previously known Kähler structure on the Eschenburg flag, we find another Kähler structure on a biquotient SU(4)//T 3 .

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Equivariant de Rham cohomology: theory and applications

Goertsches

Zoller

2019

São Paulo J. Math. Sci.

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Realization of GKM fibrations and new examples of Hamiltonian non-Kähler actions

Goertsches¹,

Konstantis²,

Zoller³

2020

Preprint

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We classify fibrations of abstract 3-regular GKM graphs over 2-regular ones, and show that all fiberwise signed fibrations of this type are realized as the projectivization of equivariant complex rank 2 vector bundles over quasitoric 4-folds or S 4 . We investigate the existence of invariant (stable) almost complex, symplectic, and Kähler structures on the total space. In this way we obtain infinitely many Kähler manifolds with Hamiltonian non-Kähler actions in dimension 6 with prescribed one-skeleton, in particular with prescribed number of isolated fixed points.

show abstract

Symplectic and Kähler structures on biquotients

Goertsches

Konstantis

Zoller

2020

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Leopold Zoller

GKM theory and Hamiltonian non-Kähler actions in dimension 6

Symplectic and Kähler structures on biquotients

Equivariant de Rham cohomology: theory and applications

Realization of GKM fibrations and new examples of Hamiltonian non-Kähler actions

Symplectic and Kähler structures on biquotients

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