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arxiv: 1903.09597 · v2 · pith:33T4DQHFnew · submitted 2019-03-22 · 🧮 math.AT · math.GT

A note on rational homological stability for automorphisms of manifolds

classification 🧮 math.AT math.GT
keywords bundlesindependentnoterangerationalsharpsmoothanalogous
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By work of Berglund and Madsen, the rings of rational characteristic classes of fibrations and smooth block bundles with fibre $D^{2n}\sharp(S^n\times S^n)^{\sharp g}$, relative to the boundary, are for $2n\ge 6$ independent of $g$ in degrees $*\le (g-6)/2$. In this note, we explain how this range can be improved to $*\le g-2$ using cohomological vanishing results due to Borel and classical invariant theory. This implies that the analogous ring for smooth bundles is independent of $g$ in the same range, provided the degree is small compared to the dimension.

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