Linear Chern-Hopf-Thurston conjecture
Abstract
If X is a closed 2n-dimensional aspherical manifold, i.e., the universal cover of X is contractible, then the Chern-Hopf-Thurston conjecture predicts that (-1)n(X)≥ 0. We prove this conjecture when X is a complex projective manifold whose fundamental group admits an almost faithful linear representation over any field. In fact, we prove a much stronger statement that if X is a complex projective manifold with large fundamental group and π1(X) admits an almost faithful linear representation, then (X, P)≥ 0 for any perverse sheaf P on X. To prove this, we introduce a vanishing cycle functor of multivalued one-forms and apply techniques from non-abelian Hodge theory, both in archimedean and non-archimedean settings. These techniques allow us to deduce the desired positivity from the geometric properties of pure and mixed period maps.
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