Geometric cycles and bounded cohomology for a cocompact lattice in SLn( R)
Abstract
We show there exists a closed locally symmetric manifold M modeled on SLn( R)/SO(n), and a non-trivial homology class in degree dim(M)-rank(M) represented by a totally geodesic submanifold that contains a circle factor. As a result, the comparison map ck:Hbk(M, R)→ Hk(M, R) is not surjective in degree k=dim(M)-rank(M). This provides a counterpart to a result of Lafont-Wang which states that ck is always surjective in degree k≥ dim(M)-rank(M)+2.
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