Triple linking and rational homology cobordism
Abstract
If a rational homology 3-sphere M bounds a rational homology 4-ball W, then the kernel of the inclusion-induced homomorphism H1(M;Z) H1(W;Z) is a Lagrangian for the Q/Z-valued torsion linking form λ2 on H1(M;Z). In this short paper, we prove that the Freedman-Krushkal triple torsion linking form λ3 (arXiv:2506.11941v3) vanishes on this Lagrangian under the assumption that H2(W;Z)=0. We then pose several questions about topological rational homology cobordism.
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