nLab cocycle space

Contents

Context

Cohomology

Homotopy theory

Mapping space

Idea
Definition
Truncation to cohomology sets
Related concepts

Idea

Given any kind of generalized cohomology theory $\mathbf{H}$ , and a domain $X$ and coefficient $A$ , the cocycle space $\mathbf{H}(X,A)$ is the “space”, or rather the the ∞-groupoid/homotopy type, whose

elements/objects are cocycles in $\mathbf{H}$ -cohomology theory on $X$ with coefficients in $A$ (hence maps/morphisms $X \to A$ );
edges/morphisms are coboundaries between these cocycles (i.e. homotopies/gauge transformations)
faces/2-morphisms are coboundaries between coboundaries;
…
n-cells/n-morphisms are $n$ th order coboundaries (i.h. higher homotopies/higher gauge transformations).

Definition

Precisely: For $\mathbf{H}$ some (∞,1)-topos, and $X,A \in \mathbf{H}$ two objects, the cocycle space of cocycles on $X$ with coefficients in $A$ is the (∞,1)-categorical hom-space $\mathbf{H}(X,A)$ .

Truncation to cohomology sets

The actual cohomology set $H(X,A)$ is the 0-truncation/connected components of the cocycle space:

H(X,A) \;=\; \pi_0\big( \mathbf{H}(X,A) \big) \,.

Similarly, if $A$ is equipped with the structure of a pointed object $\ast \overset{a_0}{\to} A$ , the cocycle space $\mathbf{H}(X,A)$ becomes canonically pointed by the constant morphism $const_{a_0} \colon X \to \ast \overset{a_0}{\to} A$ and the 0-truncation/connected components of the corresponding based loop space of the cocucle space is the cohomoloy set in one degree lower:

H(X,\Omega A) \;\simeq\; \pi_1 \big( \mathbf{H}(X,A), const_{a_0} \big) \;\simeq\; \pi_0 \big( \Omega_{const_{a_0}} \mathbf{H}(X,A) \big) \,.

Etc.

Related concepts

	homotopy	cohomology	homology
	$[S^n,-]$	$[-,A]$	$(-) \otimes A$
category theory	covariant hom	contravariant hom	tensor product
homological algebra	Ext	Ext	Tor
enriched category theory	end	end	coend
homotopy theory	derived hom space $\mathbb{R}Hom(S^n,-)$	cocycles $\mathbb{R}Hom(-,A)$	derived tensor product $(-) \otimes^{\mathbb{L}} A$

Last revised on February 16, 2020 at 07:11:21. See the history of this page for a list of all contributions to it.

nLab cocycle space

Context

Cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Homotopy theory

Mapping space

General abstract

Topology

Simplicial homotopy theory

Differential topology

Stable homotopy theory

Geometric homotopy theory

Contents

Idea

Definition

Truncation to cohomology sets

Related concepts