Cohomology groups with compact support for flat line bundles on certain complex Lie groups
Abstract
Let X be a complex surface obtained as the quotient of the complex Euclidean space C2 by a discrete subgroup of rank 3. We investigate the cohomology group H01(X, E) with compact support for a unitary flat line bundle E over X. We show the vanishing of H01(X, E) for a certain class of such pairs (X, E), which includes infinitely many examples such that H1(X, E) is non-Hausdorff and infinite dimensional.
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