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

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.