On tunnel numbers of a cable knot and its companion

Abstract

Let K be a nontrivial knot in S3 and t(K) its tunnel number. For any (p≥ 2,q)-slope in the torus boundary of a closed regular neighborhood of K in S3, denoted by K, it is a nontrivial cable knot in S3. Though t(K)≤ t(K)+1, Example 1.1 in Section 1 shows that in some case, t(K)≤ t(K). So it is interesting to know when t(K)= t(K)+1. After using some combinatorial techniques, we prove that (1) for any nontrivial cable knot K and its companion K, t(K)≥ t(K); (2) if either K admits a high distance Heegaard splitting or p/q is far away from a fixed subset in the Farey graph, then t(K)= t(K)+1. Using the second conclusion, we construct a satellite knot and its companion so that the difference between their tunnel numbers is arbitrary large.