Tautological characteristic classes II: the Witt class

arXiv - MATH - K-Theory and Homology Pub Date : 2024-03-08 DOI:arxiv-2403.05255
Jan Dymara, Tadeusz Januszkiewicz
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Abstract

Let $K$ be an arbitrary infinite field. The cohomology group $H^2(SL(2,K), H_2\,SL(2,K))$ contains the class of the universal central extension. When studying representations of fundamental groups of surfaces in $SL(2,K)$ it is useful to have classes stable under deformations (Fenchel--Nielsen twists) of representations. We identify the maximal quotient of the universal class which is stable under twists as the Witt class of Nekovar. The Milnor--Wood inequality asserts that an $SL(2,{\bf R})$-bundle over a surface of genus $g$ admits a flat structure if and only if its Euler number is $\leq (g-1)$. We establish an analog of this inequality, and a saturation result for the Witt class. The result is sharp for the field of rationals, but not sharp in general.
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同调特性类 II:维特类
让 $K$ 是一个任意的无限域。同调群 $H^2(SL(2,K),H_2\,SL(2,K))$包含普遍中心扩展的类。在研究$SL(2,K)$中曲面基本群的表示时,有一个在表示的变形(芬切尔--尼尔森扭曲)下稳定的类是非常有用的。我们把在扭转下稳定的普遍类的最大商确定为内科瓦的维特类。米尔诺--伍丁内品质(Milnor--Woodinequality)断言,当且仅当其欧拉数为$\leq (g-1)$时,在属$g$的曲面上的$SL(2,{\bf R})$束具有平面结构。我们建立了这一不等式的类比,以及维特类的饱和结果。这个结果在有理数域是尖锐的,但在一般情况下并不尖锐。
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arXiv - MATH - K-Theory and Homology
arXiv - MATH - K-Theory and Homology
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