A lower bound on critical points of the electric potential of a knot

Abstract

Given a knot K parametrized by r: [0,2π] R3, we can define the electric potential on its complement by (x) = ∫02π |r'(t)||x - r(t)|dt. Physicists and knot theorists want to understand the critical points of the potential and their behavior. The tunneling number t(K) of a knot is the smallest number of arcs one needs to add to a knot so the complement is a handlebody. We show the number of critical points of the potential is at least 2t(K) + 2. The result is proven using Morse theory and stable manifold theory.