nLab
Hurewicz theorem

Skip the Navigation Links | Home Page | All Pages | Recently Revised | Authors | Feeds | Export |

Context

Homotopy theory

Background

Variations

Definitions

Paths and cylinders

Homotopy groups

Theorems

Contents

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

Definition

(Hurewicz homomorphism)

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

Φ:π k(X,x)H k(X)\Phi : \pi_k(X,x) \to H_k(X)

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

Φ:(f:S kX) f *[S k]\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]H k(S k).

Remark

The Hurewicz homomorphism is a natural transformation between

Φ:π n()H k()\Phi : \pi_n(-) \to H_k(-)

between functors Top */ Ab.

Hurewicz theorem

Theorem

If a topological space (or infinity-groupoid) X is (n-1)-connected for n2 then the Hurewicz homomorphism, def. 1

Φ:π n(X,x)H n(X)\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).

References

This appears for instance as theorem 4.32 in

Lecture notes include

See also

Revised on February 23, 2013 16:07:23 by Anonymous Coward (85.5.61.83)
Edit | Back in time (3 revisions) | See changes | History | Views: Print | TeX | Source | Linked from: oriental, homotopy theory, anafunctor, groupoid cardinality, infinity-groupoid, model category, simplicial set, category with weak equivalences, homotopy category, derived functor, cubical set, Nonabelian Algebraic Topology, (infinity,1)-category, Kan complex, n-groupoid, simplicial object, quasi-isomorphism, homotopical category, category of fibrant objects, deformation retract, model structure on topological spaces, simplex, simplicially enriched category, path space object, horn, simplicial complex, interval object, fundamental category, Kan fibration, simplicial T-complex, small object argument, homotopy hypothesis, fibration, simplicial group, simplicial identities, fundamental infinity-groupoid, directed homotopy theory, homotopy 3-type, homotopy n-type, simplicial presheaf, homotopy limit, Grpd, SimpSet, van Kampen theorem, higher van Kampen theorem, homotopy pullback, homotopy 2-type, homotopy type, Euler characteristic, 1-groupoid, join of simplicial sets, cubical T-complex, homotopy group, fundamental group, Postnikov system, homotopy equivalence, weak homotopy equivalence, Waldhausen category, fundamental group of a topos, shape theory, Thomason model structure, derived category, mapping cone, Reedy category, generalized Reedy category, differential forms on simplices, calculus of fractions, associahedron, category of simplices, Eckmann-Hilton duality, Freudenthal suspension theorem, simplicial homotopy group, boundary of a simplex, Galois theory, generalized (Eilenberg-Steenrod) cohomology, simplicial skeleton, homotopy, homotopy (as an operation), H-space, suspension, singular simplicial complex, Kan fibrant replacement, (infinity,1)-categorical hom-space, anodyne morphism, stable homotopy theory, spin structure, derivator, homotopy - contents, cochain on a simplicial set, free groupoid, n-truncated object of an (infinity,1)-category, A-infinity-space, A1-homotopy theory, spine, Whitehead tower, string group, dendroidal set, Whitehead theorem, quasifibration, suspension object, cocylinder, Hurewicz cofibration, mapping cylinder, homotopy extension property, homotopy inverse, mapping cocone, internal infinity-groupoid, simplicial ring, cofibration, automorphism infinity-group, CW approximation, test category, Calculus of fractions and homotopy theory, decalage, Ho(Top), proper homotopy theory, homotopy Kan extension, pointed derivator, zigzag, subdivision, two-out-of-six property, geometric homotopy groups in an (infinity,1)-topos, infinite loop space, n-connected space, long exact sequence of homotopy groups, factorization lemma, augmented simplicial set, fundamental (infinity,1)-category, strict 2-groupoid, zigzag category, chain homotopy, model structure on simplicial algebras, cell complex, model structure on operator algebras, van Kampen theorem for toposes, Pi-algebra, Boardman-Vogt resolution, singular homology, localizing subcategory, geometric realization of categories, Betti number, cohomology operation, two-out-of-three, semi-simplicial set, homotopy type theory, Parametrized Homotopy Theory, looping, dendroidal homotopy coherent nerve, bisimplicial set, contents of contents, B1-homotopy theory, homotopy groups of spheres, suspension of a chain complex, Hurewicz theorem, homotopy level, function extensionality, coend in a derivator, univalence axiom, Bousfield lattice, Cartan-Eilenberg category, elegant Reedy category, Simplicial homotopy theory, simplicial homotopy theory, iterated loop space, Eilenberg subcomplex, model structure for infinity-groupoids, local fibration, reduced simplicial set, projective resolution, twisted smooth cohomology in string theory, null homotopy, ordinary homology, interval object in chain complexes, simplicial homology, homotopy class, homotopy category of chain complexes, Ho(sSet), free resolution, n-connected map, homotopical structure on C*-algebras, h-groupoid, model topos, localization of model categories, model structure for homotopy n-types, Toda bracket, differential Galois theory, semi-simplicial object, core in a 2-category, relative category