A differential graded algebra (or DG-algebra for short) A is a graded algebra equipped with a map ${\displaystyle d\colon A\to A}$  that has either degree 1 (cochain complex convention) or degree −1 (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 DG morphism between DG-algebras is a graded algebra homomorphism that respects the differential d.

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

Warning: some sources use the term DGA for a DG-algebra.

Tensor algebra edit

The tensor algebra is a DG-algebra with differential similar to that of the Koszul complex. For a vector space ${\displaystyle V}$  over a field ${\displaystyle K}$  there is a graded vector space ${\displaystyle T(V)}$  defined as

${\displaystyle T(V)=\bigoplus _{i\geq 0}T^{i}(V)=\bigoplus _{i\geq 0}V^{\otimes i}}$ 

where ${\displaystyle V^{\otimes 0}=K}$ .

If ${\displaystyle e_{1},\ldots ,e_{n}}$  is a basis for ${\displaystyle V}$  there is a differential ${\displaystyle d}$  on the tensor algebra defined component-wise

${\displaystyle d:T^{k}(V)\to T^{k-1}(V)}$ 

sending basis elements to

${\displaystyle d(e_{i_{1}}\otimes \cdots \otimes e_{i_{k}})=\sum _{1\leq j\leq k}e_{i_{1}}\otimes \cdots \otimes d(e_{i_{j}})\otimes \cdots \otimes e_{i_{k}}}$ 

In particular we have ${\displaystyle d(e_{i})=(-1)^{i}}$  and so

${\displaystyle d(e_{i_{1}}\otimes \cdots \otimes e_{i_{k}})=\sum _{1\leq j\leq k}(-1)^{i_{j}}e_{i_{1}}\otimes \cdots \otimes e_{i_{j-1}}\otimes e_{i_{j+1}}\otimes \cdots \otimes e_{i_{k}}}$ 

Koszul complex edit

One of the foundational examples of a differential graded algebra, widely used in commutative algebra and algebraic geometry, is the Koszul complex. This is because of its wide array of applications, including constructing flat resolutions of complete intersections, and from a derived perspective, they give the derived algebra representing a derived critical locus.

De-Rham algebra edit

Differential forms on a manifold, together with the exterior derivation and the exterior product form a DG-algebra. These have wide applications, including in derived deformation theory.^[2] See also de Rham cohomology.

Singular cohomology edit

• The singular cohomology of a topological space with coefficients in ${\displaystyle \mathbb {Z} /p\mathbb {Z} }$  is a DG-algebra: the differential is given by the Bockstein homomorphism associated to the short exact sequence ${\displaystyle 0\to \mathbb {Z} /p\mathbb {Z} \to \mathbb {Z} /p^{2}\mathbb {Z} \to \mathbb {Z} /p\mathbb {Z} \to 0}$ , and the product is given by the cup product. This differential graded algebra was used to help compute the cohomology of Eilenberg–MacLane spaces in the Cartan seminar.^[3][4]

• The homology ${\displaystyle H_{*}(A)=\ker(d)/\operatorname {im} (d)}$  of a DG-algebra ${\displaystyle (A,d)}$  is a graded algebra. The homology of a DGA-algebra is an augmented algebra.

• Homotopy associative algebra
• Differential graded category
• Differential graded Lie algebra
• Differential graded scheme
• Differential graded module

• Manin, Yuri Ivanovich; Gelfand, Sergei I. (2003), Methods of Homological Algebra, Berlin, New York: Springer-Verlag, ISBN 978-3-540-43583-9, see sections V.3 and V.5.6