Incompressible planar surfaces in hyperbolic link exteriors in the 3-sphere

Abstract

For each integer N≥ 3 we construct examples of N-component hyperbolic links L⊂S3 whose exterior contains an incompressible spanning planar surface P⊂ XL with one boundary component on each boundary torus of XL of nonmeridional and nonintegral slope, thus providing counterexamples to a recent conjecture of M. Eudave-Muñoz and M. Ozawa. The case N=3 is the crucial one to consider: all such link pairs (L,P) are classified and found to be generated by the structure of the exterior of hyperbolic Eudave-Muñoz knots. More generally, necessary and sufficient conditions on integers p1,p2,p3≥ 2 are given for the existence of a 3-component link in S3 whose exterior contains a spanning pants with boundary slopes of the form ai/pi. A key role in the analysis of 3-component link pairs is played by the properties of the embeddings of three mutually disjoint and nonparallel primitive circles on the boundary of a genus two handlebody. These are classified in general and in the special case when the handlebody is part of a genus two Heegaard decomposition of S3 associated with a 3-component link pair. The hyperbolic links with N≥ 4 components whose exterior contains a spanning planar surface with nonmeridional and nonintegral boundary slopes are constructed via an inductive process that starts with any of the classified 3-component hyperbolic link pairs.