On handlebody-knot pairs which realize exteriors of knotted surfaces in S3

Abstract

In this paper, we describe the relation between the study of closed connected surfaces embedded in S3 and the theory of handlebody-knots. By Fox's theorem, a pair of handlebody-knots is associated to a closed connected surface embedded in S3 in the sense that their exterior components are pairwise homeomorphic. We show that for every handlebody-knot pair associated to a genus two "prime bi-knotted" surface, one is irreducible, and the other is reducible. Furthermore, for given two genus two handlebody-knots H1 and H2 satisfying certain conditions, we will construct a "prime bi-knotted" surface whose associated handlebody-knot pair coincides with H1 and H2.