Algebraic mapping cone

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Definition

Let $<wikitex>; == Definition == Let $E \xrightarrow{f} F$ be a map of chain complexes. Define the ''algebraic mapping cone of'' $f$ as a chain complex $Cone(f)$ given in degree $k$ by $$ Cone(f)_k=E_{k-1}\oplus F_k $$ with differential $$ \partial_{Cone(f)}= \left( \begin{array}{cc} -\partial_E & 0 \ f & \partial_F \end{array} \right) : Cone(f)_k\rightarrow Cone(f)_{k-1}. $$ Every book on homological algebra contains this definition. A good source is for example \cite{Weibel1994} </wikitex> == References == {{#RefList:}}E \xrightarrow{f} F$ be a map of chain complexes. Define the algebraic mapping cone of $f$ as a chain complex $Cone(f)$ given in degree $k$ by

$\displaystyle Cone(f)_k=E_{k-1}\oplus F_k$ $\displaystyle Cone(f)_k=E_{k-1}\oplus F_k$

with differential

$\displaystyle \partial_{Cone(f)}= \left( \begin{array}{cc} -\partial_E & 0 \\ f & \partial_F \end{array} \right) : Cone(f)_k\rightarrow Cone(f)_{k-1}.$ $\displaystyle \partial_{Cone(f)}= \left( \begin{array}{cc} -\partial_E & 0 \\ f & \partial_F \end{array} \right) : Cone(f)_k\rightarrow Cone(f)_{k-1}.$

Every book on homological algebra contains this definition. A good source is for example [Weibel1994]

References

[Weibel1994] C. A. Weibel, An introduction to homological algebra, Cambridge University Press, 1994. MR1269324 (95f:18001) Zbl 0834.18001

Algebraic mapping cone

Definition

References

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