On the Morse-Novikov number for 2-knots

Abstract

Let K⊂ S4 be a 2-knot, that is, a smoothly embedded 2-sphere in S4. The Morse-Novikov number M N(K) is the minimal possible number of critical points of a Morse map S4 K S1 belonging to the canonical class in H1(S4 K). We prove that for a classical knot K⊂ S3 the Morse-Novikov number of the spun knot S(K) is ≤ 2 M N(K). This enables us to compute M N(S(K)) for every classical knot K with tunnel number 1.