Hyperbolic tunnel-number-one knots with Seifert-fibered Dehn surgeries

Abstract

Suppose α and R are disjoint simple closed curves in the boundary of a genus two handlebody H such that H[R] embeds in S3 as the exterior of a hyperbolic knot k(thus, k is a tunnel-number-one knot), and α is Seifert in H(i.e., a 2-handle addition H[α] is a Seifert-fibered space) and not the meridian of H[R]. Then for a slope γ of k represented by α, γ-Dehn surgery k(γ) is a Seifert-fibered space. Such a construction of Seifert-fibered Dehn surgeries generalizes that of Seifert-fibered Dehn surgeries arising from primtive/Seifert positions of a knot, which was introduced in [D03]. In this paper, we show that there exists a meridional curve M of k (or H[R]) in ∂ H such that α intersects M transversely in exactly one point. It follows that such a construction of a Seifert-fibered Dehn surgery k(γ) can arise from a primtive/Seifert position of k with γ its surface-slope. This result supports partially the two conjectures: (1) any Seifert-fibered surgery on a hyperbolic knot in S3 is integral, and (2) any Seifert-fibered surgery on a hyperbolic tunnel-number-one knot arises from a primitive/Seifert position whose surface slope corresponds to the surgery slope.