Weighted cohomology of arithmetic groups
Abstract
M. Goresky, G. Harder, and R. MacPherson defined weighted cohomologies of arithmetic groups in a real group G, with coefficients in certain local systems, associated to arbitrary upper and lower weight profiles. The author shows, using essentially local arguments on the reductive Borel-Serre compactification, that these cohomologies agree with certain weighted L2 cohomologies defined by J. Franke. When the rank of G is equal to that of a maximal compact subgroup, this implies that the cohomologies associated to both upper and lower middle profiles are both isomorphic to L2 cohomology.
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