Proper actions and supported-section-valued cohomology
Abstract
Consider a proper action of Zd on a smooth (perhaps non-paracompact) manifold M. The pth cohomology Hp(Zd,\ c(F)) valued in the space of compactly-supported sections of a natural sheaf F on M (such as those of smooth function germs, smooth k-form germs, etc.) vanishes for p d (the cohomological dimension of Zd) and, at d, equals the space of compactly-supported sections of the descent (G-invariant push-forward) F/Zd to the orbifold quotient M/Zd. We prove this and analogous results on Zd cohomology valued in -supported sections of an equivariant appropriately soft sheaf F in a broader context of Zd-actions proper with respect to a paracompactifying family of supports , in the sense that every member of has a neighborhood small with respect to the action in Palais' sense.
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