On the metric Koll\'ar-Pardon problem

Abstract

Let (M, g) be a compact real analytic Riemannian manifold and π M M its universal cover. Assume that M can be realised as a manifold definable in an o-minimal structure expanding Ran in such a way that the pullback metric g:=π*g is -definable. For instance, this is the case when M can be realised as a semi-algebraic submanifold in Rn in such a way that the coefficients of the metric g are semi-algebraic. We show that there exists a definable smooth map M K to a compact simply connected -definable space K such that its regular fibres are Riemann locally homogeneous with respect to the metric g. We deduce that under these assumptions π1(M) is quasi-isometric to a locally homogeneous space. In the case when M is aspherical we show that (M, g) is a homogeneous Riemannian manifold. A similar result in the setting of complex algebraic geometry was earlier conjectured by Koll\'ar and Pardon (KP). Using our results, we prove the conjecture of Koll\'ar-Pardon in the special case of smooth aspherical varieties admitting a bi-definable K\"ahler metric and discuss the analogues of this conjecture in other branches of geometry.