A triple-point Whitney trick
Abstract
We use a triple-point version of the Whitney trick to show that ornaments of three orientable (2k-1)-manifolds in R3k-1, k>2, are classified by the μ-invariant. A very similar (but not identical) construction was found independently by I. Mabillard and U. Wagner, who also made it work in a much more general situation and obtained impressive applications. The present note is, by contrast, focused on a minimal working case of the construction.
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