2-vector bundle (changes) in nLab
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Context
Bundles
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vector bundle, 2-vector bundle, (∞,1)-vector bundle
real, complex/holomorphic, quaternionic
Cohomology
Special and general types
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group cohomology, nonabelian group cohomology, Lie group cohomology
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cohomology with constant coefficients / with a local system of coefficients
Special notions
Variants
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differential cohomology
Operations
Theorems
Contents
Idea
A 2-module bundle / 2-vector bundle is a fiber ∞-bundle whose typical fiber is a 2-module/2-vector space.
Definition
Let RR be a commutative ring, or more generally an E-∞ ring. By the discussion at 2-vector space consider the 2-category
2Vect R≃Alg R 2 Vect_R \simeq Alg_R
equivalent to that whose objects are associative algebras (or generally algebras) AA over RR, (being placeholders for the 2-vector space AModA Mod which is the category of modules over AA) whose 1-morphisms are bimodules between these algebras (inducing linear functors between the corresponding 2-vector spaces = categories of modules) and whose 2-morphisms are homomorphisms between those.
Under Isbell duality and by the discussion at Modules – as generalized vector bundles we may think of this 2-category as being that of (generalized) 2-vector bundles over a space called SpecRSpec R.
Examples
References
Via completing nn-tunles of vector bundles
See at BDR 2-vector bundle.
As algebra bundles with bimodule bundles between them
The notion of 2-vector bundles based on regarding 2-vector spaces as algebras with bimodules between them (here) is first discussed in
- Urs Schreiber, Konrad Waldorf, §4.4 of: Connections on non-abelian Gerbes and their Holonomy, Theory Appl. Categ., 28 17 (2013) 476-540 [[arXiv:0808.1923](https://arxiv.org/abs/0808.1923), tac:28-17]
and much further developed in
- Peter Kristel, Matthias Ludewig, Konrad Waldorf, The insidious bicategory of algebra bundles [[arXiv:2204.03900](https://arxiv.org/abs/2204.03900)]
The example of the stringor bundle:
- Peter Kristel, Matthias Ludewig, Konrad Waldorf, A representation of the string 2-group, [[arXiv:2206.09797](https://arxiv.org/abs/2206.09797)]
Reviewed in:
- Konrad Waldorf, The stringor bundle, talk at QFT and Cobordism, CQTS (Mar 2023) [[web](Center+for+Quantum+and+Topological+Systems#WaldorfMar2023)]
Last revised on March 16, 2023 at 09:54:38. See the history of this page for a list of all contributions to it.