Complex projective plane

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Definition

The complex projective plane is the complex projective space of complex dimension 2. As a manifold over the reals, it has dimension 4. It is denoted ${\displaystyle \mathbb{C}{\mathbb{P}}^2}$ or ${\displaystyle {\mathbb{P}}^2(\mathbb{C})}$.

Alternatively, it can be viewed as the quotient of the space ${\displaystyle S^2(\mathbb{C})\cong S^5}$ under the action of ${\displaystyle S^0(\mathbb{C})\cong S^1}$ by multiplication. In particular, there is a fibration ${\displaystyle S^1\to S^5\to \mathbb{C}{\mathbb{P}}^2}$.

Algebraic topology

Homology groups

Further information: homology of complex projective space

The homology groups with coefficients in ${\displaystyle \mathbb{Z}}$ are as follows: ${\displaystyle H_0(\mathbb{C}{\mathbb{P}}^2)\cong H_2(\mathbb{C}{\mathbb{P}}^2)\cong H_4(\mathbb{C}{\mathbb{P}}^2)\cong \mathbb{Z}}$, and all other homology groups are zero.

More generally, the homology group with coefficients in a module ${\displaystyle M}$ over a commutative unital ring ${\displaystyle R}$ are as follows: ${\displaystyle H^0(\mathbb{C}{\mathbb{P}}^2;M)\cong H^2(\mathbb{C}{\mathbb{P}}^2;M)\cong H^4(\mathbb{C}{\mathbb{P}}^2;M)\cong M}$, and all other homology groups are zero.

Cohomology groups

Further information: cohomology of complex projective space

The cohomology groups with coefficients in ${\displaystyle \mathbb{Z}}$ are as follows: ${\displaystyle H^0(\mathbb{C}{\mathbb{P}}^2)\cong H^2(\mathbb{C}{\mathbb{P}}^2)\cong H^4(\mathbb{C}{\mathbb{P}}^2)\cong \mathbb{Z}}$, and all other cohomology groups are zero. The cohomology ring is ${\displaystyle \mathbb{Z}[x]/(x^3)}$ where ${\displaystyle x}$ is an additive generator for the second cohomology group.

More generally, the cohomology group with coefficients in a commutative unital ring ${\displaystyle R}$ are as follows: ${\displaystyle H^0(\mathbb{C}{\mathbb{P}}^2;R)\cong H^2(\mathbb{C}{\mathbb{P}}^2;R)\cong H^4(\mathbb{C}{\mathbb{P}}^2;R)\cong R}$, and all other cohomology groups are zero. The cohomology ring is ${\displaystyle R[x]/(x^3)}$ where ${\displaystyle x}$ is a ${\displaystyle R}$-module generator for the second cohomology module.

Homotopy groups

Further information: homotopy of complex projective space

The homotopy groups are as follows: