Companions of the unknot and width additivity

Abstract

It has been conjectured that for knots K and K' in S3, w(K#K')= w(K)+w(K')-2. Scharlemann and Thompson have proposed potential counterexamples to this conjecture. For every n, they proposed a family of knots Kni for which they conjectured that w(Bn#Kni)=w(Kni) where Bn is a bridge number n knot. We show that for n>2 none of the knots in Kni produces such counterexamples.