nLab
twisted de Rham cohomology

Idea

For $X$ a smooth manifold and $H \in Ω^{3} (X)$ a closed differential 3-form, the $H$ twisted de Rham complex is the $ℤ_{2}$ -graded vector space $Ω^{even} (X) \oplus Ω^{odd} (X)$ equipped with the $H$ -twisted de Rham differential

d + H \land (-) : Ω^{even / odd} (X) \to Ω^{odd / even} (X),

Notice that this is nilpotent, due to the odd degree of $H$ , such that $H \land H = 0$ , and the closure of $H$ , $d H = 0$ .

Twisted de Rham cohomology is the recipient of the twisted Chern character in twisted differential K-theory.

Created on May 20, 2011 06:49:35 by Urs Schreiber (131.211.238.38)