Bar complex

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In mathematics, the bar complex, also called the bar resolution, bar construction, standard resolution, or standard complex, 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,^[1] and Henri Cartan and Eilenberg^[2] and has since been generalized in many ways. The name "bar complex" comes from the fact that Eilenberg and Mac Lane^[1] used a vertical bar | as a shortened form of the tensor product ${\displaystyle \otimes }$ in their notation for the complex.

Let ${\displaystyle R}$ be an algebra over a field ${\displaystyle k}$, let ${\displaystyle M_1}$ be a right ${\displaystyle R}$-module, and let ${\displaystyle M_2}$ be a left ${\displaystyle R}$-module. Then, one can form the bar complex ${\displaystyle {\mathrm{Bar}}_R(M_1,M_2)}$ given by

${\displaystyle \cdots \to M_1{\otimes }_{k}R{\otimes }_{k}R{\otimes }_k{M}_2\to M_1{\otimes }_{k}R{\otimes }_k{M}_2\to M_1{\otimes }_k{M}_2\to 0,}$

with the differential

${\displaystyle \begin{array}{rl}d(m_1\otimes r_1\otimes \cdots \otimes r_n\otimes m_2)& =m_1{r}_1\otimes \cdots \otimes r_n\otimes m_2\\ & +{\displaystyle \sum _{i=1}^{n-1}}(-1{)}^i{m}_1\otimes r_1\otimes \cdots \otimes r_i{r}_{i+1}\otimes \cdots \otimes r_n\otimes m_2+(-1{)}^n{m}_1\otimes r_1\otimes \cdots \otimes r_n{m}_2\end{array}}$

The bar complex is useful because it provides a canonical way of producing (free) resolutions of modules over a ring. However, often these resolutions are very large, and can be prohibitively difficult to use for performing actual computations.

Let ${\displaystyle M}$ be a left ${\displaystyle R}$-module, with ${\displaystyle R}$ a unital ${\displaystyle k}$-algebra. Then, the bar complex ${\displaystyle {\mathrm{Bar}}_R(R,M)}$ gives a resolution of ${\displaystyle M}$ by free left ${\displaystyle R}$-modules. Explicitly, the complex is^[3]

${\displaystyle \cdots \to R{\otimes }_{k}R{\otimes }_{k}R{\otimes }_{k}M\to R{\otimes }_{k}R{\otimes }_{k}M\to R{\otimes }_{k}M\to 0,}$

This complex is composed of free left ${\displaystyle R}$-modules, since each subsequent term is obtained by taking the free left ${\displaystyle R}$-module on the underlying vector space of the previous term.

To see that this gives a resolution of ${\displaystyle M}$, consider the modified complex

${\displaystyle \cdots \to R{\otimes }_{k}R{\otimes }_{k}R{\otimes }_{k}M\to R{\otimes }_{k}R{\otimes }_{k}M\to R{\otimes }_{k}M\to M\to 0,}$

Then, the above bar complex being a resolution of ${\displaystyle M}$ is equivalent to this extended complex having trivial homology. One can show this by constructing an explicit homotopy ${\displaystyle h_n:R^{{\otimes }_{k}n}{\otimes }_{k}M\to R^{{\otimes }_k(n+1)}{\otimes }_{k}M}$ between the identity and 0. This homotopy is given by

${\displaystyle \begin{array}{rl}{h}_n(r_1\otimes \cdots \otimes r_n\otimes m)& ={\displaystyle \sum _{i=1}^{n-1}}(-1{)}^{i+1}{r}_1\otimes \cdots \otimes r_{i-1}\otimes 1\otimes r_i\otimes \cdots \otimes r_n\otimes m\end{array}}$

One can similarly construct a resolution of a right ${\displaystyle R}$-module ${\displaystyle N}$ by free right modules with the complex ${\displaystyle {\mathrm{Bar}}_R(N,R)}$.

Notice that, in the case one wants to resolve ${\displaystyle R}$ as a module over itself, the above two complexes are the same, and actually give a resolution of ${\displaystyle R}$ by ${\displaystyle R}$-${\displaystyle R}$-bimodules. This provides one with a slightly smaller resolution of ${\displaystyle R}$ by free ${\displaystyle R}$-${\displaystyle R}$-bimodules than the naive option ${\displaystyle {\mathrm{Bar}}_{R^e}(R^e,M)}$. Here we are using the equivalence between ${\displaystyle R}$-${\displaystyle R}$-bimodules and ${\displaystyle R^e}$-modules, where ${\displaystyle R^e=R\otimes R^{\mathrm{op}}}$, see bimodules for more details.

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

• Koszul complex

• Ginzburg, Victor (2005). "Lectures on Noncommutative Geometry". arXiv:math.AG/0506603.
• Weibel, Charles (1994), An Introduction to Homological Algebra, Cambridge Studies in Advanced Mathematics, 38, Cambridge: Cambridge University Press, ISBN 0-521-43500-5 

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