On the Rational Hyperbolicity problem

Abstract

We prove that a compact simply connected manifold M with a variationally complete G-action satisfying certain mild conditions (e.g. trivial principal isotropy, or simply connected principal orbits) is rationally elliptic if and only if M/G is flat. This answers several conjectures and problems regarding the rational homotopy of manifolds with symmetries. On the other hand, without the extra conditions we find examples of rationally elliptic G-manifolds M where M/G admits a hyperbolic metric.

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