W$-triviality of low dimensional manifolds
manuscripta math. 175, (2024) A space $X$ is $W$-trivial if for every real vector bundle $\alpha$ over $X$ the total Stiefel-Whitney class $w(\alpha)$ is 1. It follows from a result of Milnor that if $X$ is an orientable closed smooth manifold of dimension $1,2,4$ or $8$, then $X$ is not $W$-trivial...
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| Zusammenfassung: | manuscripta math. 175, (2024) A space $X$ is $W$-trivial if for every real vector bundle $\alpha$ over $X$
the total Stiefel-Whitney class $w(\alpha)$ is 1. It follows from a result of
Milnor that if $X$ is an orientable closed smooth manifold of dimension $1,2,4$
or $8$, then $X$ is not $W$-trivial. In this note we completely characterize
$W$-trivial orientable connected closed smooth manifolds in dimensions $3,5$
and $6$. In dimension $7$, we describe necessary conditions for an orientable
connected closed smooth $7$-manifold to be $W$-trivial. |
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| DOI: | 10.48550/arxiv.2306.11685 |