On the Volume Conjecture for hyperbolic Dehn-filled 3-manifolds along the twist knots

Abstract

For a twist knot Kp', let M be the closed 3-manifold obtained by doing (p, q) Dehn-filling along Kp'. In this article, we prove that Chen-Yang's volume conjecture holds for sufficiently large |p| + |q| and |p'| for M. In the proof, we construct a new ideal triangulation of the Whitehead link complement which is different from Thurston's triangulation. Our triangulation has led to some new discoveries regarding symmetry, including insights into ``sister manifolds'' as introduced by Hodgson, Meyerhoff, and Weeks.

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