An Excision Theorem in Heegaard Floer Theory

Abstract

Let Y1 be a closed, oriented 3-manifold and denote a non-separating closed, orientable surface in Y1 which consists of two connected components of the same genus. By cutting Y1 along and re-gluing it using an orientation-preserving diffeomorphism of we obtain another closed, oriented 3-manifold Y2. When the excision surface is of genus one, we show that twisted Heegaard Floer homology groups of Y1 and Y2 (twisted with coefficients in the universal Novikov ring) are isomorphic. We use this excision theorem to demonstrate that certain manifolds are not related by the excision construction on a genus one surface. Additionally, we apply the excision formula to compute twisted Heegaard Floer homology groups of 0-surgery on certain two-component links, including some families of 2-bridge links.

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