homological algebra Homological algebra is the branch of mathematics that studies homology (mathematics), homology in a general algebraic setting. It is a relatively young discipline, whose origins can be traced to investigations in combinatorial topology (a precurs ...

, the hyperhomology or hypercohomology (

\mathbb_*(-), \mathbb^*(-)

) is a generalization of (co)homology functors which takes as input not objects in an abelian category

\mathcal

but instead chain complexes of objects, so objects in

\text(\mathcal)

. It is a sort of cross between the derived functor cohomology of an object and the homology of a chain complex since hypercohomology corresponds to the derived Global sections functor, global sections functor

\mathbf^*\Gamma(-)

. Hyperhomology is no longer used much: since about 1970 it has been largely replaced by the roughly equivalent concept of a derived functor between derived categories.

Motivation

One of the motivations for hypercohomology comes from the fact that there isn't an obvious generalization of cohomological long exact sequences associated to short exact sequences

$0 \to M' \to M \to M'' \to 0$

i.e. there is an associated long exact sequence

$0 \to H^0(M') \to H^0(M) \to H^0(M'')\to H^1(M') \to \cdots$

It turns out hypercohomology gives techniques for constructing a similar cohomological associated long exact sequence from an arbitrary long exact sequence

$0 \to M_1 \to M_2\to \cdots \to M_k \to 0$

since its inputs are given by chain complexes instead of just objects from an abelian category. We can turn this chain complex into a distinguished triangle (using the language of triangulated categories on a derived category)

$M_1 \to [M_2 \to \cdots \to M_] \to M_k[-k+3] \xrightarrow$

which we denote by

$\mathcal'_\bullet \to \mathcal_\bullet \to \mathcal''_\bullet \xrightarrow$

Then, taking derived global sections

\mathbf^*\Gamma(-)

gives a long exact sequence, which is a long exact sequence of hypercohomology groups.

Definition

We give the definition for hypercohomology as this is more common. As usual, hypercohomology and hyperhomology are essentially the same: one converts from one to the other by dualizing, i.e. by changing the direction of all arrows, replacing injective objects with projective ones, and so on. Suppose that ''A'' is an abelian category with Injective_object#Enough_injectives, enough injectives and ''F'' a left exact functor to another abelian category ''B''. If ''C'' is a complex of objects of ''A'' bounded on the left, the hypercohomology :H^''i''(''C'') of ''C'' (for an integer ''i'') is calculated as follows: # Take a quasi-isomorphism ''Φ'' : ''C'' → ''I'', here ''I'' is a complex of injective elements of ''A''. # The hypercohomology H^''i''(''C'') of ''C'' is then the cohomology ''H''^''i''(''F''(''I'')) of the complex ''F''(''I''). The hypercohomology of ''C'' is independent of the choice of the quasi-isomorphism, up to unique isomorphisms. The hypercohomology can also be defined using derived category, derived categories: the hypercohomology of ''C'' is just the cohomology of ''RF''(''C'') considered as an element of the derived category of ''B''. For complexes that vanish for negative indices, the hypercohomology can be defined as the derived functors of H⁰ = ''FH''⁰ = ''H''⁰''F''.

The hypercohomology spectral sequences

There are two hypercohomology spectral sequences; one with ''E''₂ term :

R^iF(H^j(C))

and the other with ''E''₁ term :

R^jF(C^i)

and ''E''₂ term :

H^i(R^jF(C))

both converging to the hypercohomology :

H^(RF(C))

, where ''R''^''j''''F'' is a right derived functor of ''F''.

Applications

One application of hypercohomology spectral sequences are in the study of Gerbe, gerbes. Recall that rank n vector bundles on a space

X

can be classified as the Cech-cohomology group

H^1(X,\underline_n)

. The main idea behind gerbes is to extend this idea cohomologically, so instead of taking

H^1(X,\textbf^0F)

for some functor

F

, we instead consider the cohomology group

H^1(X,\textbf^1F)

, so it classifies objects which are glued by objects in the original classifying group. A closely related subject which studies gerbes and hypercohomology is Deligne cohomology, Deligne-cohomology.

Examples

References