On the continuous cohomology of diffeomorphism groups
Abstract
Suppose that M is a connected orientable n-dimensional manifold and m>2n. If Hi(M,)=0 for i>0, it is proved that for each m there is a monomorphism Hm(Wn,O(n)) Hmcont(DiffM,). If M is closed and oriented, it is proved that for each m there is a monomorphism Hm(Wn,O(n)) Hm-ncont(Diff+M,), where Diff+M is a group of preserving orientation diffeomorphisms of M.
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