PL-genus of surfaces in homology balls

Abstract

We consider manifold-knot pairs (Y,K) where Y is a homology sphere that bounds a homology ball. We show that the minimum genus of a PL surface in a homology ball X such that ∂ (X, ) = (Y, K) can be arbitrarily large. Equivalently, the minimum genus of a surface cobordism in a homology cobordism from (Y, K) to any knot in S3 can be arbitrarily large. The proof relies on Heegaard Floer homology.