Homology of complex projective space

This article describes the homology of the following space or class of spaces: complex projective space

Statement

The homology of complex projective space is given as follows:

${\displaystyle H_p(\mathbb{C}{P}^n)=\mathbb{Z}p=0,2,4,\dots ,2n}$

and zero otherwise.

Related invariants

Betti numbers

The Betti numbers are ${\displaystyle 1}$ for ${\displaystyle 0,2,4,\dots ,2n}$ and ${\displaystyle 0}$ elsewhere.

Poincare polynomial

The Poincare polynomial is given by:

${\displaystyle PX=1+x^2+x^4+\dots +x^{2n}=\frac{x^{2n+2}-1}{x^2-1}}$

Euler characteristic

The Euler characteristic is ${\displaystyle n+1}$.

Cohomology ring=

Further information: Cohomology ring of complex projective space

Proof

We use the CW-complex structure on complex projective space that has exactly one cell in every even dimension till ${\displaystyle 2n}$. The cellular chain complex of this thus has ${\displaystyle \mathbb{Z}}$s in all the even positions till ${\displaystyle 2n}$, and hence its homology is ${\displaystyle \mathbb{Z}}$ in all even dimensions till ${\displaystyle 2n}$.