Symplectic 4--manifolds with K = 0 and the Lubotzky alternative

@article{Friedl2011Symplectic4W,
  title={Symplectic 4--manifolds with K = 0 and the Lubotzky alternative},
  author={Stefan Friedl and Stefano Vidussi},
  journal={arXiv: Geometric Topology},
  year={2011}
}
In this paper we use the Lubotzky alternative for finitely generated linear groups to determine which 4-manifolds admitting a free circle action can be endowed with a symplectic structure with trivial canonical class. The content of this paper partly overlaps with the content of the unpublished preprint "Symplectic 4-manifolds with a free circle action" (arXiv:0801.1313 [math.GT]). 
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References

SHOWING 1-10 OF 44 REFERENCES
Construction of symplectic structures on 4-manifolds with a free circle action
Twisted Alexander polynomials and fibered 3-manifolds
SYMPLECTIC 4-MANIFOLDS WITH KODAIRA DIMENSION ZERO
Almost complex 4-manifolds with vanishing first Chern class
THE SEIBERG-WITTEN INVARIANTS AND SYMPLECTIC FORMS
The topology of symplectic circle bundles
More constraints on Symplectic forms from Seiberg-Witten invariants
Kodaira dimension and symplectic sums
On the asphericity of a symplectic M^3 x S^1
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