A **mixed complex** is both a chain complex and a cochain complex in a compatible way. Equivalently, it is a dg-module over the dg-algebra $k[B]/(B^2)$, where $k$ is the base ring, $B$ is of degree $-1$, and $dB = 0$. Mixed complexes were introduced in the study of cyclic homology.

- Christian Kassel,
*Cyclic homology, comodules and mixed complexes*, J. Alg. 107 (1987), 195–216.

Created on July 8, 2014 at 04:27:36. See the history of this page for a list of all contributions to it.