Tunnel number one knots satisfy the Berge Conjecture
Abstract
Let K be a tunnel number one knot in M with irreducible knot exterior, where M is either S3, or a connected sum of S2× S1 with any lens space. (In particular, this includes M = S2× S1.) We prove that if a non-trivial Dehn surgery on K yields a lens space, then K is a doubly primitive knot in M. For M = S3 this resolves the tunnel number one Berge Conjecture. For M = S2× S1 this resolves a conjecture of Greene and Baker-Buck-Lecuona for tunnel number one knots.
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