T-duality simplifies bulk-boundary correspondence: some higher dimensional cases
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Publication:730130
DOI10.1007/s00023-016-0505-6zbMath1354.81065arXiv1506.04492OpenAlexW1807107679MaRDI QIDQ730130
Varghese Mathai, Guo Chuan Thiang
Publication date: 23 December 2016
Published in: Annales Henri Poincaré (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1506.04492
Related Items (12)
The index theorem of lattice Wilson-Dirac operators via higher index theory ⋮ T-duality simplifies bulk-boundary correspondence ⋮ T-duality simplifies bulk-boundary correspondence: the noncommutative case ⋮ Differential topology of semimetals ⋮ Bulk-edge correspondence and the cobordism invariance of the index ⋮ Global topology of Weyl semimetals and Fermi arcs ⋮ Topological insulators and the Kane–Mele invariant: Obstruction and localization theory ⋮ T-duality and the bulk-boundary correspondence ⋮ The \(K\)-theoretic bulk-edge correspondence for topological insulators ⋮ A non-commutative framework for topological insulators ⋮ `Real' Gerbes and Dirac cones of topological insulators ⋮ Bulk-boundary correspondence for disordered free-fermion topological phases
Cites Work
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- Bulk and boundary invariants for complex topological insulators. From \(K\)-theory to physics
- On the \(K\)-theoretic classification of topological phases of matter
- Topological invariants of edge states for periodic two-dimensional models
- Twisted equivariant matter
- Bulk-edge correspondence for two-dimensional topological insulators
- The bulk-edge correspondence for the quantum Hall effect in Kasparov theory
- \(T\)-duality simplifies bulk-boundary correspondence: the parametrised case
- Non-commutative differential geometry
- Superconnections, Thom classes, and equivariant differential forms
- Cyclic cohomology of crossed products with \({\mathbb{Z}}\)
- An analogue of the Thom isomorphism for crossed products of a C* algebra by an action of R
- C*-algebras associated with irrational rotations
- Strong Morita equivalence of certain transformation group \(C^*\)-algebras
- Discrete magnetic Laplacian
- D-branes, \(T\)-duality, and index theory
- \(K\)-theory of continuous fields of quantum tori
- \(T\)-duality for torus bundles with \(H\)-fluxes via noncommutative topology
- Boundary maps for \(C^*\)-crossed products with \(\mathbb R\) with an application to the quantum Hall effect
- Twisted crossed products of \(C^*\)-algebras. II
- Equality of bulk and edge Hall conductance revisited
- Quantization of edge currents for continuous magnetic operators
- \(T\)-duality: topology change from \(H\)-flux
- Real Baum-Connes assembly and T-duality for torus orientifolds
- Classification of ``quaternionic Bloch-bundles: topological quantum systems of type AII
- \(T\)-duality for torus bundles with H-fluxed via noncommutative topology. II: The high dimensional case and the \(T\)-duality group
- T-duality simplifies bulk-boundary correspondence
- Topology and<mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" display="inline"><mml:mi>H</mml:mi></mml:math>-Flux of<mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" display="inline"><mm
- The non-commutativenth-Chern number (n⩾ 1)
- Quantization of interface currents
- PARAMETRIZED STRICT DEFORMATION QUANTIZATION OF C*-BUNDLES AND HILBERT C*-MODULES
- Noncommutative principal torus bundles via parametrised strict deformation quantization
- T-duality of topological insulators
- Topological phases: Isomorphism, homotopy and K-theory
- Twisted crossed products of C*-algebras
- Deformation quantization for actions of 𝑅^{𝑑}
- The noncommutative geometry of the quantum Hall effect
- EDGE CURRENT CHANNELS AND CHERN NUMBERS IN THE INTEGER QUANTUM HALL EFFECT
- Cuntz-Krieger algebras of infinite graphs and matrices
- Chern number and edge states in the integer quantum Hall effect
- Notes on topological insulators
- Twisted index theory on good orbifolds. II: Fractional quantum numbers
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