Splitting links by integer homology spheres
Abstract
For every n 3, we construct 2-component links in Sn+1 that are a split by an integer homology n-sphere, but not by Sn. In the special case n=3, i.e. that of 2-links in S4, we produce an infinite family of links L and of integer homology spheres Y such that the link L is (topologically or smoothly) split by Y and by no other integer homology sphere in the family.
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