nLab reduction and lift of structure groups

Redirected from "lift of structure groups".
Contents

Context

Cohomology

cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Contents

Idea

For GKG \to K a monomorphism of groups, a GG-structure on a KK-principal bundle is a reduction of the structure group from KK to GG.

Alternatively, for GKG \to K an epimorphism of groups, a GG-structure on a KK-principal bundle is a lift of the structure group from KK to GG.

A GG-reduction of the frame bundle of a smooth manifold is called a G-structure.

Remark

As one passes to higher differential geometry, the (epi, mono) factorization system dissolves into the infinite tower of (n-epi, n-mono) factorization systems, and hence the distinction between reduction and lift of structure groups blurs. One may just consider generally for GKG\to K a homomorphism of ∞-groups the problem of factoring a modulating morphism XBKX\to \mathbf{B}K through this morphism, up to a chosen homotopy.

Definition

We spell out three equivalent definitions.

Let H\mathbf{H} be the ambient (∞,1)-topos, let G,KGrp(H)G,K \in Grp(\mathbf{H}) be two ∞-groups and let ϕ:GK\phi : G \to K be a homomorphism, hence Bϕ:BGBK\mathbf{B}\phi : \mathbf{B}G \to \mathbf{B}K the morphism in H\mathbf{H} between their deloopings. Write

KG BG Bϕ BK \array{ K\sslash G &\to& \mathbf{B}G \\ && \downarrow^{\mathrlap{\mathbf{B}\phi}} \\ && \mathbf{B}K }

for the corresponding fiber sequence, with KGK \sslash G the homotopy fiber of the given morphism. By the discussion at ∞-action this exhibits the canonical KK-∞-action on the coset object KGK\sslash G.

Let furthermore PXP \to X be a KK-principal ∞-bundle in H\mathbf{H}. By the discussion there this is modulated essentially uniquely by a cocycle morphism k:XBKk : X \to \mathbf{B}K such that there is a fiber sequence

P X BK. \array{ P &\to& X \\ && \downarrow \\ && \mathbf{B}K } \,.

Reduction of the cocycle

The reduction of the structure of the cocycle kk is a diagram

X σ BG k σ˜ BK \array{ X &&\stackrel{\sigma}{\to}&& \mathbf{B}G \\ & {}_{\mathllap{k}}\searrow &\swArrow_{\tilde\sigma}& \swarrow \\ && \mathbf{B}K }

in H\mathbf{H}, hence a morphism

σ:kBϕ \sigma : k \to \mathbf{B}\phi

in the slice (∞,1)-topos B /BK\mathbf{B}_{/\mathbf{B}K}.

Section of the associated coset-bundle

By the discussion at associated ∞-bundle such a diagram is equivalently a section

σΓ X(P× KKG) \sigma \in \Gamma_X(P \times_{K} K\sslash G)

of the associated KGK \sslash G fiber ∞-bundle.

Equivariant map to the coset

The above is the categorical semantics of what in the homotopy type theory internal language of H\mathbf{H} is given by the syntax

( x:BKPKG):Type. \vdash (\prod_{x : \mathbf{B}K} P \to K\sslash G) : Type \,.

See the discussion at ∞-action.

This expresses the fact that the reduction of the structure group along ϕ\phi is equivalently a KK-equivariant map PKGP \to K\sslash G.

Examples

References

In the generality of principal infinity-bundles, reductions/lifts of structure groups are discused in section 4.3 of

Last revised on July 18, 2024 at 12:49:45. See the history of this page for a list of all contributions to it.