Aspherical manifolds

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An earlier version of this page was published in the Bulletin of the Manifold Atlas: screen, print.

You may view the version used for publication as of 12:23, 27 September 2012 and the changes since publication.

1 Introduction

A path-connected space $ == Introduction == <wikitex>; A path-connected space $X$ is called aspherical is its higher homotopy groups vanish: $\pi_i(X) = 0$ for all $i \geq 2$. This article is about closed, aspherical manifolds $M$ which are connected manifolds with contractible universal cover $\widetilde M \simeq *$. </wikitex> == Construction and examples == <wikitex>; * $S^1$ is aspherical. * Any [[Surface|surface]] $F$, not homeomorphic to $S^2$ or $\Rr P^2$ is aspherical. * A closed, oriented $-manifold $M$ is aspherical if and only if it is [[irreducible]] and $\pi_1(M)$ is torsion free. * In any dimension, if $M$ admits a metric of non-positive [[Wikipedia:Sectional_curvature|sectional curvature]] then $M$ is aspherical. * If $L$ is a Lie group with $\pi_0(L)$ finite, $K$ is a maximal compact subgroup of $L$ and $G$ is a discrete torsion free lattice in $L$ then $$G \backslash L/K$$ is aspherical. </wikitex> == Invariants == <wikitex>; YOUR TEXT HERE ... </wikitex> == Classification/Characterization (if available) == <wikitex>; YOUR TEXT HERE ... </wikitex> == Further discussion == <wikitex>; YOUR TEXT HERE ... </wikitex> == References == {{#RefList:}}  [[Category:Manifolds]] {{Stub}}X$ is called aspherical is its higher homotopy groups vanish: $\pi_i(X) = 0$ for all $i \geq 2$ . This article is about closed, aspherical manifolds $M$ which are connected manifolds with contractible universal cover $\widetilde M \simeq *$ .

2 Construction and examples

$S^1$ is aspherical.
Any surface $F$ , not homeomorphic to $S^2$ or $\Rr P^2$ is aspherical.
A closed, oriented $3$ -manifold $M$ is aspherical if and only if it is irreducible and $\pi_1(M)$ is torsion free.
In any dimension, if $M$ admits a metric of non-positive sectional curvature then $M$ is aspherical.
If $L$ is a Lie group with $\pi_0(L)$ finite, $K$ is a maximal compact subgroup of $L$ and $G$ is a discrete torsion free lattice in $L$ then