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paper

Macroscopic dimension and duality groups

arXiv:1208.0524

Abstract

We show that for a rationally inessential orientable closed $n$-manifold $M$ whose fundamental group $π$ is a duality group the macroscopic dimension of its universal cover is strictly less than $n$:$$ \dim_{MC}\Wi M<n.$$ As a corollary we obtain the following 0.1 Theorem. The inequality $ \dim_{MC}\Wi M<n$ holds for the universal cover of a closed spin $n$-manifold $M$ with a positive scalar curvature metric if the fundamental group $π_1(M)$ is a virtual duality group virtually satisfying the Analytic Novikov Conjecture.

This is a short English version of a paper published in Russian