An invitation to higher gauge theory

Baez, John C.; Huerta, John

doi:10.1007/s10714-010-1070-9

Cited by 187 publications

(349 citation statements)

References 101 publications

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“…At this level, the even and odd-dimensions are fundamentally different -in even dimensions, the structure factors of the algebra are proportional to the D/2'th Chern number, while in odd dimensions they are not proportional to the expected Chern-Simons form. The D-commutator hints at a different group structure from the usual gauge theories, such as higher gauge theories [27,28]. In light of this, the recent proposal [29] to describe topological insulators by a BF theory [30] looks very promising.…”

Section: Discussionmentioning

confidence: 99%

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D-algebra structure of topological insulators

2012

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In the quantum Hall effect, the density operators at different wave-vectors generally do not commute and give rise to the Girvin MacDonald Plazmann algebra with important consequences such as ground-state center of mass degeneracy at fractional filling fraction, and W1+∞ symmetry of the filled Landau levels. We show that the natural generalization of the GMP algebra to higher dimensional topological insulators involves the concept of a D-commutator. For insulators in even dimensional space, the D-commutator is isotropic and closes, and its structure factors are proportional to the D/2-Chern number. In odd dimensions, the algebra is not isotropic, contains the weak topological insulator index (layers of the topological insulator in one less dimension) and does not contain the Chern-Simons θ form. This algebraic structure paves the way towards the identification of fractional topological insulators through the counting of their excitations. The possible relation to D-dimensional volume preserving diffeomorphisms and parallel transport of extended objects is also discussed.

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Section: Discussionmentioning

confidence: 99%

“…In higher dimensions, the D-algebra involves the D-form F ∧ · · · ∧ F . The natural objects that can couple to a D-form are D − 2 dimensional membranes [28]. Interestingly, the classical limit of the D-commutator is the Nambu-Poisson bracket [33], which is a natural setup to describe the dynamics of classical membranes [32].…”

Section: Discussionmentioning

confidence: 99%

D-algebra structure of topological insulators

2012

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“…Along this line, the authors of [15] have proposed a generalization of parallel transport of point-like objects to parallel transport of string-like objects. This higher parallel transport leads to a gauge theory of a 2-form gauge field.…”

Section: Jhep07(2016)125mentioning

confidence: 99%

“…Then, as is discussed in [15], an action with nonabelian gauge symmetry cannot be formulated except for a topological action of BF type. As a result, the theory becomes topological or essentially free.…”

Section: Jhep07(2016)125mentioning

confidence: 99%

“…The corresponding physical field strength is the degree |z| + 1 part of the super field strength F Z , 15) where | |z|+1 denotes taking the degree |z| + 1 part. We can define a degree-preserving map,ã : T [1]Σ → M n , such that, for a function of degree k on the target space, the pullbackã * chooses the component of k-th order in θ µ in the superfield expansion, i.e.,…”

Section: Jhep07(2016)125mentioning

confidence: 99%

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Higher gauge theories from Lie n-algebras and off-shell covariantization

Carow-Watamura

Heller

Ikeda

et al. 2016

J. High Energ. Phys.

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Abstract:We analyze higher gauge theories in various dimensions using a supergeometric method based on a differential graded symplectic manifold, called a QP-manifold, which is closely related to the BRST-BV formalism in gauge theories. Extensions of the Lie 2-algebra gauge structure are formulated within the Lie n-algebra induced by the QPstructure. We find that in 5 and 6 dimensions there are special extensions of the gauge algebra. In these cases, a restriction of the gauge symmetry by imposing constraints on the auxiliary gauge fields leads to a covariantized theory. As an example we show that we can obtain an off-shell covariantized higher gauge theory in 5 dimensions, which is similar to the one proposed in [1].

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Notes on generalized global symmetries in QFT

Sharpe

2015

Fortschritte der Physik

130

141

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It was recently argued that quantum field theories possess one-form and higher-form symmetries, labelled `generalized global symmetries.' In this paper, we describe how those higher-form symmetries can be understood mathematically as special cases of more general 2-groups and higher groups, and discuss examples of quantum field theories admitting actions of more general higher groups than merely one-form and higher-form symmetries. We discuss analogues of topological defects for some of these higher symmetry groups, relating some of them to ordinary topological defects. We also discuss topological defects in cases in which the moduli `space' (technically, a stack) admits an action of a higher symmetry group. Finally, we outline a proposal for how certain anomalies might potentially be understood as describing a transmutation of an ordinary group symmetry of the classical theory into a 2-group or higher group symmetry of the quantum theory, which we link to WZW models and bosonization.Comment: 47 pages, LaTeX; v2: references added; v3: more references added; v4: added pub info; v5: added referenc

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An invitation to higher gauge theory

Cited by 187 publications

References 101 publications

D-algebra structure of topological insulators

D-algebra structure of topological insulators

Higher gauge theories from Lie n-algebras and off-shell covariantization

Notes on generalized global symmetries in QFT

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