#
nLab

twisted de Rham cohomology

### Context

#### Differential cohomology

**differential cohomology**

## Ingredients

## Connections on bundles

## Higher abelian differential cohomology

## Higher nonabelian differential cohomology

## Fiber integration

## Application to gauge theory

# Contents

## Idea

For $X$ a smooth manifold and $H \in \Omega^3(X)$ a closed differential 3-form, the $H$ **twisted de Rham complex** is the $\mathbb{Z}_2$-graded vector space $\Omega^{even}(X) \oplus \Omega^{odd}(X)$ equipped with the $H$-twisted de Rham differential

$d + H \wedge(-) \;\colon\; \Omega^{even/odd}(X) \to \Omega^{odd/even}(X)
\,,$

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

## Properties

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

Revised on February 26, 2016 06:02:05
by

Urs Schreiber
(82.113.121.116)