Tunnel-number-one knot exteriors in S3 disjoint from proper power curves

Abstract

As one of the background papers of the classification project of hyperbolic primitive/Seifert knots in S3 whose complete list is given in [BK20], this paper classifies all possible R-R diagrams of two disjoint simple closed curves R and β lying in the boundary of a genus two handlebody H up to equivalence such that β is a proper power curve and a 2-handle addition H[R] along R embeds in S3 so that H[R] is the exterior of a tunnel-number-one knot. As a consequence, if R is a nonseparating simple closed curve on the boundary of a genus two handlebody such that H[R] embeds in S3, then there exists a proper power curve disjoint from R if and only if H[R] is the exterior of the unknot, a torus knot, or a tunnel-number-one cable of a torus knot. The results of this paper will be mainly used in proving the hyperbolicity of P/SF knots and in classifying P/SF knots in once-punctured tori in S3, which is one of the types of P/SF knots in [BK20]. Together with these results, the preliminary of this paper which consists of three parts: the three diagrams which are Heegaard diagrams, R-R diagrams, and hybrid diagrams, `the Culling Lemma', and locating waves into an R-R diagrams, will also be used in the classification of hyperbolic primitive/Seifert knots in S3.