Teichm\"uller space of negatively curved metrics on Complex Hyperbolic Manifolds is not contractible
Abstract
In this paper we prove that for all n=4k-2, k2 there exists a closed smooth complex hyperbolic manifold M with real dimension n having non-trivial π1(T<0(M)). T<0(M) denotes the Teichm\"uller space of all negatively curved Riemannian metrics on M, which is the topological quotient of the space of all negatively curved metrics modulo the space of self-diffeomorphisms of M that are homotopic to the identity.
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