Triple torsion, triple cup products, and embedding obstructions for rational homology 3-spheres

Abstract

Freedman and Krushkal introduced a triple torsion linking form for rational homology 3-spheres and used it to obstruct locally flat embeddings in S4. For every odd prime p, we identify their triple torsion form, computed with parameter t=p on rational homology 3-spheres whose first homology has exponent p, with the mod-p triple cup product under torsion-linking duality. For algebraically split p-framed surgery links, this gives a signed formula in terms of Milnor's integral length-three invariants μijk, with the framing-sign factor dictated by torsion-linking duality. We then use Borromean band-sums to realize arbitrary mod-p triple cup tensors on rational homology 3-spheres with H1( Z/p)6 and fixed hyperbolic ordinary torsion linking form. Finally, using the classical spinor/Klein model for the split six-dimensional quadratic space, we classify the tensors with no dual null Hantzsche pair. This produces, for every odd prime p, a rational homology 3-sphere with hyperbolic ordinary torsion linking form but with no locally flat embedding in S4, and indeed no locally flat embedding in any integer homology 4-sphere.