Cocycle: Difference between revisions

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Template:One source 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]

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

• Čech cohomology
• Cocycle condition

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