nLab
Hurewicz theorem

Contents

Not to be confused with the Hurwitz theorem.

Context

Homotopy theory

Idea
Hurewicz homomorphism

For topological spaces
For spectra

Hurewicz theorem
Related concepts
References

Idea

The first nonzero homotopy group and ordinary/singular homology group of a simply-connected topological space occur in the same dimension and are isomorphic.

Hurewicz homomorphism

For topological spaces

Definition

(Hurewicz homomorphism)

For $(X,x)$ a pointed topological space, the Hurewicz homomorphism is the function

\Phi : \pi_k(X,x) \to H_k(X)

from the $k$ th homotopy group of $(X,x)$ to the $k$ th singular homology group defined by sending

\Phi : (f : S^k \to X)_{\sim} \mapsto f_*[S_k]

a representative singular $k$ -sphere $f$ in $X$ to the push-forward along $f$ of the fundamental class $[S_k] \in H_k(S^k) \simeq \mathbb{Z}$ .

Remark

The Hurewicz homomorphism is a natural transformation between

\Phi : \pi_k(-) \to H_k(-)

between functors $Top^{*/} \to$ Ab.

For spectra

The above construction has an immediate analog in stable homotopy theory:

For $R$ a ring, its Eilenberg-MacLane spectrum is an E-infinity ring and hence receives a canonical unit homomorphism $\mathbb{S} \longrightarrow H R$ from the sphere spectrum.

Under smash product and passing to stable homotopy group, this induces a natural transformation from stable homotopy groups of $X$ (its stable homotopy homology theory) to ordinary homology of $X$ with coefficients in $R$ :

\pi^{st}_\bullet(X) \;\simeq\; \pi_\bullet( \mathbb{S} \wedge X_+ ) \longrightarrow \pi_\bullet( H R \wedge X_+ ) \simeq H_\bullet(X,R) \,.

If here the Eilenberg-MacLane spectrum $H R$ is replaced by any other E-infinity ring spectrum the analogous construction is called the Boardman homomorphism.

Hurewicz theorem

Theorem

If a topological space (or infinity-groupoid) $X$ is (n-1)-connected for $n \geq 2$ then the Hurewicz homomorphism, def.

\Phi : \pi_n(X,x) \to H_n(X)

is an isomorphism.

A proof is spelled out for instance with theorem 2.1 in (Hutchings).

Remark

With the universal coefficient theorem a corresponding statement follows for the cohomology group $H^n(X,A)$ .

Related concepts

Boardman homomorphism
The Adams spectral sequence is a vast generalization of the computation of homotopy groups from cohomology groups via the Hurewicz theorem.

References

Named after Witold Hurewicz.

The basic statement is for instance in

Allen Hatcher, Algebraic Topology (web)

Lecture notes include

Michael Hutchings, Introduction to higher homotopy groups and obstruction theory (2011) (pdf)

For discussion in stable homotopy theory modeled on symmetric spectra is in

Stefan Schwede, part II, prop. 6.30 of Symmetric spectra, 2012 (pdf)

nLab Hurewicz theorem

Context

Homotopy theory

Contents

Idea

Hurewicz homomorphism

For topological spaces

Definition

Remark

For spectra

Hurewicz theorem

Theorem

Remark

Related concepts

References

nLab
Hurewicz theorem