Bounding the ribbon numbers of knots and links

Abstract

The ribbon number r(K) of a ribbon knot K ⊂ S3 is the minimal number of ribbon intersections contained in any ribbon disk bounded by K. We find new lower bounds for r(K) using (K) and K(t), and we prove that the set Rr~=~\K(t)~:~r(K)~≤~r\ is finite and computable. We determine R2 and R3, applying our results to compute the ribbon numbers for all ribbon knots with 11 or fewer crossings, with three exceptions. Finally, we find lower bounds for ribbon numbers of links derived from their Jones polynomials.