Lower Bound for the Simplicial Volume of Closed Manifolds Covered by $\mathbb{H}^{2}\times\mathbb{H}^{2}\times\mathbb{H}^{2}$

Xiaofeng Meng

Lower Bound for the Simplicial Volume of Closed Manifolds Covered by H2×H2×H2

Abstract

We estimate the upper bound for the ∞-norm of the volume form on H2×H2×H2 seen as a class in Hc6(PSL2R×PSL2R×PSL2R;R). This gives the lower bound for the simplicial volume of closed Riemennian manifolds covered by H2×H2×H2. The proof of these facts yields an algorithm to compute the lower bound of closed Riemannian manifolds covered by (H2)n.

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