Growth of mod-2 homology in higher rank locally symmetric spaces
classification
🧮 math.AT
keywords
gammabackslashmathbbhigherhomologyranksymmetricapplication
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Let $X$ be a higher rank symmetric space or a Bruhat-Tits building of dimension at least $2$ such that the isometry group of $X$ has property $(T)$. We prove that for every torsion free lattice $\Gamma\subset {\rm Isom} X$ any homology class in $H_1(\Gamma\backslash X,\mathbb F_2)$ has a representative cycle of total length $o_X({\rm Vol}(\Gamma\backslash X))$. As an application we show that $\dim_{\mathbb F_2} H_1(\Gamma\backslash X,\mathbb F_2)=o_X({\rm Vol}(\Gamma\backslash X)).$
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