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A triple torsion linking form and 3-manifolds in $S^4$

Published 13 Jun 2025 in math.GT | (2506.11941v1)

Abstract: Given a rational homology 3-sphere $M$, we introduce a triple linking form on $H_1(M; \mathbb{Z})$, defined when the classical torsion linking pairing of three homology classes vanishes pairwise. If $M$ is the boundary of a simply-connected 4-manifold $N$, the triple linking form can be computed in terms of the higher order intersection form on $N$, introduced by Matsumoto. We use these methods to formulate an embedding obstruction for rational homology spheres in $S4$, extending a 1938 theorem of Hantzsche.

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