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arxiv: 1411.7003 · v1 · pith:FKVYSAR2new · submitted 2014-11-25 · 🧮 math.AT · math.AG

The characteristic rank and cup-length in oriented Grassmann manifolds

classification 🧮 math.AT math.AG
keywords cup-lengthorientedtimesboundscharacteristicgrassmannpartrank
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In the first part, this paper studies the characteristic rank of the canonical oriented $k$-plane bundle over the Grassmann manifold $SO(n)/(SO(k) \times SO(n-k))$ of oriented $k$-planes in Euclidean $n$-space. It presents infinitely many new exact values if $k = 3$ or $k = 4$, as well as new lower bounds for the number in question if $k > 4$. In the second part, these results enable us to improve on the general upper bounds for the $Z/2Z$-cup-length of $SO(n)/(SO(k) \times SO(n-k))$. In particular, for $SO(2^t)/(SO(3) \times SO(2^t-3))$ (with $t > 2$) we prove that the cup-length is equal to $2^t-3$, which verifies the corresponding claim of Tomohiro Fukaya's conjecture from 2008.

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