Double complex explained

In mathematics, specifically Homological algebra, a double complex is a generalization of a chain complex where instead of having a

Z

-grading, the objects in the bicomplex have a

Z x Z

-grading. The most general definition of a double complex, or a bicomplex, is given with objects in an additive category

l{A}

. A bicomplex[1] is a sequence of objects

Cp,q\inOb(l{A})

with two differentials, the horizontal differential

dh:Cp,q\toCp+1,q

and the vertical differential
v:C
d
p,q

\toCp,q+1

which have the compatibility relation

dh\circdv=dv\circdh

Hence a double complex is a commutative diagram of the form

\begin{matrix} &&\vdots&&\vdots&&\\ &&\uparrow&&\uparrow&&\\ &\to&Cp,q+1&\to&Cp+1,q+1&\to&\\ &&\uparrow&&\uparrow&&\\ &\to&Cp,q&\to&Cp+1,q&\to&\\ &&\uparrow&&\uparrow&&\\ &&\vdots&&\vdots&&\\ \end{matrix}

where the rows and columns form chain complexes.

Some authors[2] instead require that the squares anticommute. That is

dh\circdv+dv\circdh=0.

This eases the definition of Total Complexes. By setting

fp,q=(-1)p

v
d
p,q

\colonCp,q\toCp,q-1

, we can switch between having commutativity and anticommutativity. If the commutative definition is used, this alternating sign will have to show up in the definition of Total Complexes.

Examples

There are many natural examples of bicomplexes that come up in nature. In particular, for a Lie groupoid, there is a bicomplex associated to it[3] pg 7-8 which can be used to construct its de-Rham complex.

X

there's a bicomplex of differential forms

\Omegap,q(X)

whose components are linear or anti-linear. For example, if

z1,z2

are the complex coordinates of

C2

and

\overline{z}1,\overline{z}2

are the complex conjugate of these coordinates, a

(1,1)

-form is of the form

fa,bdza\wedged\overline{z}b

See also

Additional applications

Notes and References

  1. Web site: Section 12.18 (0FNB): Double complexes and associated total complexes—The Stacks project. 2021-07-08. stacks.math.columbia.edu.
  2. Book: Weibel, Charles A.. An introduction to homological algebra. 1994. Cambridge University Press. 978-1-139-64863-9. Cambridge [England]. 847527211.
  3. 0803.1529. math.QA. Jonathan. Block. Calder. Daenzer. Mukai duality for gerbes with connection. 2009-01-09.