Cross product

This article describes a binary operation involving the cohomology groups of one or more topological spaces

Definition

Let ${\displaystyle X,Y}$ be topological spaces and ${\displaystyle R}$ a commutative ring. The cross product or external cup product is a bilinear map given by:

${\displaystyle H^{i}(X;R)\times H^{j}(Y;R)\to H^{i+j}(X\times Y;R)}$

Equivalently it can be viewed as a linear map:

${\displaystyle H^{i}(X;R)\otimes H^{j}(Y;R)\to H^{i+j}(X\times Y;R)}$

The map is defined as follows:

${\displaystyle a\times b=p_{1}^{*}(a)\cup p_{2}^{*}(b)}$

where ${\displaystyle p_{1},p_{2}}$ are the projections from ${\displaystyle X\times Y}$ to ${\displaystyle X}$ and to ${\displaystyle Y}$, and where ${\displaystyle \cup }$ is defined as the usual cup product.

The cross product also has a relative version. Let ${\displaystyle (X,A)}$ and ${\displaystyle (Y,B)}$ be two pairs of topological spaces. The cross product then gives a map:

${\displaystyle H^{i}(X,A;R)\times H^{j}(Y,B;R)\to H^{i+j}(X\times Y,X\times B\cup A\times Y;R)}$

again defined in the same way:

${\displaystyle a\times b=p_{1}^{*}(a)\cup p_{2}^{*}(b)}$

where ${\displaystyle p_{1},p_{2}}$ are the projections.