Coverings of torus knots in S2× S1 and universals
Abstract
Let tα,β⊂ S2× S1 be an ordinary fiber of a Seifert fibering of S2× S1 with two exceptional fibers of order α. We show that any Seifert manifold with Euler number zero is a branched covering of S2× S1 with branching tα,β if α≥3. We compute the Seifert invariants of the Abelian covers of S2× S1 branched along a tα,β. We also show that t2,1, a non-trivial torus knot in S2× S1, is not universal.
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