Whitehead product

This article describes a binary operation involving the homotopy groups of a topological space

Definition

The Whitehead product is a product relating the homotopy groups of a topological space as follows:

${\displaystyle \pi _{k}(X)\times \pi _{l}(X)\to \pi _{k+l-1}(X)}$

It is defined as follows: consider the CW-complex structure on ${\displaystyle S^{k}\times S^{l}}$. The gluing of the ${\displaystyle k+l}$-cell is achieved by an attaching map from ${\displaystyle S^{k+l-1}}$ to ${\displaystyle S^{k}\vee S^{l}}$, and hence we can get a based map from ${\displaystyle S^{k+l-1}}$ to ${\displaystyle X}$ using based maps from ${\displaystyle S^{k}}$ to ${\displaystyle X}$ and ${\displaystyle S^{l}}$ to ${\displaystyle X}$. This is designated as the Whitehead product.

Facts

• The Whitehead product when ${\displaystyle k=l=1}$ returns the commutator of the two elements
• The Whitehead product when ${\displaystyle k=1}$, is ${\displaystyle (g,a)\mapsto g.a-a}$ where ${\displaystyle g.a}$ arises from the natural action of ${\displaystyle \pi _{1}(X)}$ on ${\displaystyle \pi _{l}(X)}$ Further information: Actions of the fundamental group