Cohomology of torus bundles over Kuga fiber varieties

Min Ho Lee

Abstract: A Kuga fiber variety is a family of abelian varieties parametrized by a locally symmetric space and is constructed by using an equivariant holomorphic map of Hermitian symmetric domains. We construct a complex torus bundle $\mathcal T$ over a Kuga fiber variety $Y$ parametrized by $X$ and express its cohomology $H^* (\mathcal T, \mathbb C)$ in terms of the cohomology of $Y$ as well as in terms of the cohomology of the locally symmetric space $X$.

Keywords: torus bundles, Kuga fiber varieties, arithmetic varieties

Classification (MSC2000): 14K99, 11F75

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