Differential graded algebra

In mathematics, in particular abstract algebra and topology, a differential graded algebra is a graded algebra with an added chain complex structure that respects the algebra structure.

Definition

A differential graded algebra (or simply DG-algebra) A is a graded algebra equipped with a map which is either degree 1 (cochain complex convention) or degree (chain complex convention) that satisfies two conditions:

A more succinct way to state the same definition is to say that a DG-algebra is a monoid object in the monoidal category of chain complexes.

A differential graded augmented algebra (or simply DGA-algebra) or an augmented DG-algebra is a DG-algebra equipped with a morphism^{[clarification needed]} to the ground ring (the terminology is due to Henri Cartan).^[1]

Many sources use the term DGAlgebra for a DG-algebra.^{[citation needed]}

Examples of DG-algebras

• The Koszul complex is a DG-algebra.
• The tensor algebra is a DG-algebra with differential similar to that of the Koszul complex.
• The singular cohomology of a topological space with coefficients in Z/pZ is a DG-algebra: the differential is given by the Bockstein homomorphism associated to the short exact sequence 0 → Z/pZ → Z/p²Z → Z/pZ → 0, and the product is given by the cup product.
• Differential forms on a manifold, together with the exterior derivation and the wedge product form a DG-algebra. See also de Rham cohomology.

Other facts about DG-algebras

• The homology of a DG-algebra is a graded algebra. The homology of a DGA-algebra is an augmented algebra.

See also

• Differential graded category
• Differential graded Lie algebra
• Differential graded scheme (which is obtained by gluing the spectra of graded-commutative differential graded algebras with respect to the étale topology.)

References

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