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String Topology, Euler Class and TNCZ free loop fibrations
Published 30 Aug 2013 in math.AT | (1308.6684v1)
Abstract: Let $M$ be a connected, closed oriented manifold. Let $\omega\in Hm(M)$ be its orientation class. Let $\chi(M)$ be its Euler characteristic. Consider the free loop fibration $\Omega M\buildrel{i}\over\hookrightarrow LM\buildrel{ev}\over\twoheadrightarrow M$. For any class $a\in H*(LM)$ of positive degree, we prove that the cup product $\chi(M)a\cup ev*(\omega)$ is null. In particular, if $i:H^(LM;\mathbb{F}_p)\twoheadrightarrow H*(\Omega M;\mathbb{F}_p)$ is onto then $\chi(M)$ is divisible by $p$ (or $M$ is a point).
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