Standard complex - Misplaced Pages

(Redirected from Standard resolution) Technique for constructing resolutions in homological algebra "Standard resolution" redirects here. For the television monitor size, see Standard-definition television.

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In mathematics, the standard complex, also called standard resolution, bar resolution, bar complex, bar construction, is a way of constructing resolutions in homological algebra. It was first introduced for the special case of algebras over a commutative ring by Samuel Eilenberg and Saunders Mac Lane (1953) and Henri Cartan and Eilenberg (1956, IX.6) and has since been generalized in many ways.

The name "bar complex" comes from the fact that Eilenberg & Mac Lane (1953) used a vertical bar | as a shortened form of the tensor product $\otimes$ in their notation for the complex.

Definition

If A is an associative algebra over a field K, the standard complex is

\cdots \rightarrow A\otimes A\otimes A\rightarrow A\otimes A\rightarrow A\rightarrow 0\,,

with the differential given by

d(a_{0}\otimes \cdots \otimes a_{n+1})=\sum _{i=0}^{n}(-1)^{i}a_{0}\otimes \cdots \otimes a_{i}a_{i+1}\otimes \cdots \otimes a_{n+1}\,.

If A is a unital K-algebra, the standard complex is exact. Moreover, $[\dots \to A \otimes A \otimes A \to A \otimes A]$ is a free A-bimodule resolution of the A-bimodule A.

Normalized standard complex

The normalized (or reduced) standard complex replaces $A\otimes A\otimes \cdots \otimes A\otimes A$ with $A\otimes (A/K)\otimes \cdots \otimes (A/K)\otimes A$ .

Monads

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References

Cartan, Henri; Eilenberg, Samuel (1956), Homological algebra, Princeton Mathematical Series, vol. 19, Princeton University Press, ISBN 978-0-691-04991-5, MR 0077480
Eilenberg, Samuel; Mac Lane, Saunders (1953), "On the groups of $H(\Pi ,n)$ . I", Annals of Mathematics, Second Series, 58: 55–106, doi:10.2307/1969820, ISSN 0003-486X, JSTOR 1969820, MR 0056295
Ginzburg, Victor (2005). "Lectures on Noncommutative Geometry". arXiv:math.AG/0506603.

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Categories:

Definition

Normalized standard complex

Monads

See also

References