Rational homotopy sphere

Template:Short description In algebraic topology, a rational homotopy ${\displaystyle n}$-sphere is an ${\displaystyle n}$-dimensional manifold with the same rational homotopy groups as the ${\displaystyle n}$-sphere. These serve, among other things, to understand which information the rational homotopy groups of a space can or cannot measure and which attenuations result from neglecting torsion in comparison to the (integral) homotopy groups of the space.

A rational homotopy ${\displaystyle n}$-sphere is an ${\displaystyle n}$-dimensional manifold ${\displaystyle \mathrm{\Sigma }}$ with the same rational homotopy groups as the ${\displaystyle n}$-sphere ${\displaystyle S^n}$:

${\displaystyle {\pi }_k(\mathrm{\Sigma })\otimes \mathbb{Q}={\pi }_k(S^n)\otimes \mathbb{Q}\cong \{\begin{array}{cc}\mathbb{Z}& ;k=n\text{ if }n\text{ even}\\ \mathbb{Z}& ;k=n,2n-1\text{ if }n\text{ odd}\\ 1& ;\text{otherwise}\end{array}.}$

• Every (integral) homotopy sphere is a rational homotopy sphere.

• The ${\displaystyle n}$-sphere ${\displaystyle S^n}$ itself is obviously a rational homotopy ${\displaystyle n}$-sphere.
• The Poincaré homology sphere is a rational homology ${\displaystyle 3}$-sphere in particular.
• The real projective space ${\displaystyle ℝP^n}$ is a rational homotopy sphere for all ${\displaystyle n>0}$. The fiber bundle ${\displaystyle S^0\to S^n\to ℝP^n}$^[1] yields with the long exact sequence of homotopy groups^[2] that ${\displaystyle {\pi }_k(ℝP^n)\cong {\pi }_k(S^n)}$ for ${\displaystyle k>1}$ and ${\displaystyle n>0}$ as well as ${\displaystyle {\pi }_1(ℝP^1)=\mathbb{Z}}$ and ${\displaystyle {\pi }_1(ℝP^n)={\mathbb{Z}}_2}$ for ${\displaystyle n>1}$,^[3] which vanishes after rationalization. ${\displaystyle ℝP^1\cong S^1}$ is the sphere in particular.

• Rational homology sphere

• Template:Citation

• rational homotopy sphere at the nLab