Lens spaces and toroidal Dehn fillings

Let M be a simple 3-manifold with a toral boundary component ∂0M . If Dehn filling M along ∂0M one way produces a toroidal manifold, and Dehn filling M along ∂0M another way produces a boundary-reducible manifold, then we show that the absolute value of the intersection number on ∂0M of the two fill

Let M be a compact, connected, orientable, irreducible 3-manifold whose boundary is a torus. We announce that if two Dehn fillings create reducible manifold and toroidal manifold, then the maximal distance is three.

We prove that if M is a connected, compact, orientable, irreducible 3-manifold with incompressible torus boundary and r is a planar boundary slope in ∂M, then either M contains an essential non-persistent torus with boundary slope r, or a closed essential torus which compresses in the Dehn filling M

We obtain an infinite family of hyperbolic knots in a solid torus which admit half-integral, toroidal and annular surgeries. Among this family we find a knot with two toroidal and annular surgeries; one is integral and the other is half-integral, and their distance is 5. This example realizes the ma