Every graph has an embedding in S3 containing no non-hyperbolic knot

Abstract

In contrast with knots, whose properties depend only on their extrinsic topology in S3, there is a rich interplay between the intrinsic structure of a graph and the extrinsic topology of all embeddings of the graph in S3 . For example, it was shown in [2] that every embedding of the complete graph K7 in S3 contains a non-trivial knot. Later in it was shown that for every m ∈ N, there is a complete graph Kn such that every embedding of Kn in S3 contains a knot Q whose minimal crossing number is at least m. Thus there are arbitrarily complicated knots in every embedding of a sufficiently large complete graph in S3. We prove here the contrasting result that every graph has an embedding in S3 such that every non-trivial knot in that embedding is hyperbolic. Our theorem implies that every graph has an embedding in S3 which contains no composite or satellite knots.