Extending Quotients of Knot Groups over Surfaces in B4

Abstract

Let K⊂eq S3 be a knot with exterior EK, and denote by π1(EK) G a quotient of its group. We give a sharp obstruction to the existence of a connected, oriented, smooth surface F⊂eq B4 with ∂ F = K over whose exterior extends surjectively. Equivalently, we determine whether the cover of S3 branched over K and induced by bounds a connected cover of B4 branched along such a surface. When G is a dihedral group, we show the obstruction can be computed by evaluating the Seifert form of K on a single curve, a so-called characteristic knot associated to . When the dihedral obstruction vanishes, we construct the surface F explicitly.