Abstract
We show that a closed, connected and orientable Riemannian manifold $M$ of dimension $d$ that admits a nonconstant quasiregular mapping from $\mathrm{R}^d$ must have bounded dimension of the cohomology independent of the distortion of the map. The dimension of the degree $1$ de Rham cohomology of $M$ is bounded above by $\binom{d}{l}$. This is a sharp upper bound that proves the Bonk-Heinonen conjecture. A corollary of this theorem answers an open problem posed by Gromov in 1981. He asked whether there exists a $d$-dimensional, simply connected manifold that does not admit a quasiregular mapping from $\mathbb{R}^d$. Our result gives an affirmative answer to this question.
Citation
Eden Prywes. "A bound on the cohomology of quasiregularly elliptic manifolds." Ann. of Math. (2) 189 (3) 863 - 883, May 2019. https://doi.org/10.4007/annals.2019.189.3.5
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