Cocycle

Closed cochain

In mathematics a cocycle is a closed cochain. Cocycles are used in algebraic topology to express obstructions (for example, to integrating a differential equation on a closed manifold). They are likewise used in group cohomology. In autonomous dynamical systems, cocycles are used to describe particular kinds of map, as in Oseledets theorem.[1]

Definition

Algebraic Topology

Let X be a CW complex and C n ( X ) {\displaystyle C^{n}(X)} be the singular cochains with coboundary map d n : C n 1 ( X ) C n ( X ) {\displaystyle d^{n}:C^{n-1}(X)\to C^{n}(X)} . Then elements of ker  d {\displaystyle {\text{ker }}d} are cocycles. Elements of im  d {\displaystyle {\text{im }}d} are coboundaries. If φ {\displaystyle \varphi } is a cocycle, then d φ = φ = 0 {\displaystyle d\circ \varphi =\varphi \circ \partial =0} , which means cocycles vanish on boundaries. [2]

See also

  • Čech cohomology
  • Cocycle condition

References

  1. ^ "Cocycle - Encyclopedia of Mathematics".
  2. ^ Hatcher, Allen (2002). Algebraic Topology (1st ed.). Cambridge: Cambridge University Press. p. 198. ISBN 9780521795401. MR 1867354.


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