Conjugacy separability of Seifert 3-manifold groups over non-orientable surfaces

R.B.J.T Allenby,Goansu Kim,C.Y Tang

doi:10.1016/j.jalgebra.2009.10.003

Conjugacy separability of Seifert 3-manifold groups over non-orientable surfaces

R.B.J.T Allenby, Goansu Kim + Show 1 more

https://doi.org/10.1016/j.jalgebra.2009.10.003

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Journal: Journal of Algebra	Publication Date: Oct 21, 2009
Citations: 1	License type: elsevier-specific: oa user license

Affiliation: University of Leeds, Yeungnam University, University of Waterloo

#Non-orientable Surfaces #Groups In Case + Show 3 more

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Abstract

Scott (1978) [12] showed Seifert 3-manifold groups are subgroup separable. Niblo (1992) [9] improved this result by showing that these groups are double coset separable. In Allenby, Kim and Tang (2005) [2] it was shown that all but two types of groups in the orientable case are conjugacy separable. Martino (2007) [7] using topological results showed that Seifert groups are conjugacy separable. Here we use algebraic method to show that Seifert groups over non-orientable surfaces are conjugacy separable.

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