nLab derived module

Redirected from "derived modules".

Given a group homomorphism, $\varphi:H\to G$ , the derived module of $\varphi$ is a $\mathbb{Z}[G]$ -module, $D_\varphi$ , together with a (universal) $\varphi$ -derivation,

\partial_\varphi :H\to D_\varphi,

such that, given any $\varphi$ -derivation, $f_1:H\to M$ , for $M$ a $G$ -module, there is a unique $G$ -module morphism, $\overline{f_1}: D_\varphi\to M$ such that $f_1= \overline{f_1}\circ \partial_\varphi$ .

Examples

If $\varphi$ is the identity morphism on $G$ then the augmentation ideal, $I(G)$ , together with

d_G:G\to I(G)

sending $g$ to $g-1$ is the derived module of $id_G$ aka the derived module of $G$ .

References

For the original version of derived module, see

R. H. Crowell, The derived module of a homomorphism, Advances in Math., 5, (1971), 210–238.

For applications in arithmetic topology

Masanori Morishita, Knots and Primes: An Introduction to Arithmetic Topology, 2012 (web)

Last revised on August 27, 2018 at 14:03:59. See the history of this page for a list of all contributions to it.