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arxiv: 2010.09869 · v2 · pith:6BI4EEAAnew · submitted 2020-10-19 · 🧮 math.GT · math.AT

Inertia groups in the metastable range

classification 🧮 math.GT math.AT
keywords sigmagroupsinertiamanifoldmanifoldsmetastableproverange
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We prove that the inertia groups of all sufficiently-connected, high-dimensional $(2n)$-manifolds are trivial. This is a key step toward a general classification of manifolds in the metastable range. Specifically, for $m \gg 0$ and $k>5/12$, suppose $M$ is a $\lfloor km \rfloor$-connected, smooth, closed, oriented $m$-manifold and $\Sigma$ is an exotic $m$-sphere. We prove that, if $M \sharp \Sigma$ is diffeomorphic to $M$, then $\Sigma$ bounds a parallelizable manifold. Our proof is built on an understanding of the second extended power functor in Pstr\k{a}gowski's category of synthetic spectra.

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