The Künneth formula

Recall the tensor product of abelian groups:

Tensor Product of Abelian Groups

Let and be abelian groups. The tensor product is defined as the abelian group generated by the symbols for , subject to the following relations for all and :

Consequences of the Definition

• Zero Element: The zero element of is . The relations imply that and for any .
• Inverses: The inverse of an element is , which can be shown to be equal to and .
• Integer Multiplication: For any integer , the relations imply that .

Properties of Tensor Products

Let , and be abelian groups.

1. Commutativity: .
2. Distributivity over Direct Sums: .
3. Associativity: .
4. Identity Element: .
5. Tensor Product with Cyclic Groups: .
6. Induced Homomorphisms: A pair of homomorphisms and induces a homomorphism via the rule on generators:
7. Universal Property: A bilinear map induces a unique homomorphism from the tensor product into , which sends to .

Cross Product

Cross Product

Let and be topological spaces, and let be a ring. The cross product is a bilinear map that sends , where and are the projection maps.

Lemma

The cross product is bilinear, so it induces

Künneth Formula for Cohomology

If and are CW complexes and or is a finitely generated free -module for all , then the cross product is an isomorphism of graded rings.

e.g.

The general Künneth formula relates the (co)homology of a product to the (co)homology of the factors, giving a tensor-product term plus a torsion correction via ⁡ over the chosen coefficient ring .