Forum of Mathematics, Sigma (Jan 2024)

PL-Genus of surfaces in homology balls

  • Jennifer Hom,
  • Matthew Stoffregen,
  • Hugo Zhou

DOI
https://doi.org/10.1017/fms.2023.126
Journal volume & issue
Vol. 12

Abstract

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We consider manifold-knot pairs $(Y,K)$ , where Y is a homology 3-sphere that bounds a homology 4-ball. We show that the minimum genus of a PL surface $\Sigma $ in a homology ball X, such that $\partial (X, \Sigma ) = (Y, K)$ can be arbitrarily large. Equivalently, the minimum genus of a surface cobordism in a homology cobordism from $(Y, K)$ to any knot in $S^3$ can be arbitrarily large. The proof relies on Heegaard Floer homology.

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