Bulk-edge correspondence and the cobordism invariance of the index
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Publication:4595004
DOI10.1142/S0129055X17500337zbMath1403.19004arXiv1611.08073MaRDI QIDQ4595004
Publication date: 27 November 2017
Published in: Reviews in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1611.08073
Related Items (3)
Equivalence of electric, magnetic, and electromagnetic Chern numbers for topological photonic crystals ⋮ Topological invariants and corner states for Hamiltonians on a three-dimensional lattice ⋮ Spectral flows of Toeplitz operators and bulk-edge correspondence
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
- \(\mathbb Z_{2}\)-indices and factorization properties of odd symmetric Fredholm operators
- Topological invariants of edge states for periodic two-dimensional models
- Twisted equivariant matter
- Bulk-edge correspondence for two-dimensional topological insulators
- Classification of ``real Bloch-bundles: topological quantum systems of type AI
- The bulk-edge correspondence for the quantum Hall effect in Kasparov theory
- Controlled topological phases and bulk-edge correspondence
- \(T\)-duality simplifies bulk-boundary correspondence: the parametrised case
- The \(K\)-theoretic bulk-edge correspondence for topological insulators
- T-duality simplifies bulk-boundary correspondence: some higher dimensional cases
- Charge deficiency, charge transport and comparison of dimensions
- Spectral flow for skew-adjoint Fredholm operators
- Equality of bulk and edge Hall conductance revisited
- Classification of ``quaternionic Bloch-bundles: topological quantum systems of type AII
- On the periodicity theorem for complex vector bundles
- On the \(C^*\)-algebraic approach to topological phases for insulators
- Clifford modules
- The index of elliptic operators. I
- The index of elliptic operators. III
- Equivariant K-theory
- T-duality simplifies bulk-boundary correspondence
- The ℤ2 index of disordered topological insulators with time reversal symmetry
- A non-commutative framework for topological insulators
- T-duality of topological insulators
- Periodic table for topological insulators and superconductors
- The noncommutative geometry of the quantum Hall effect
- Self-Adjoint Fredholm Operators And Spectral Flow
- EDGE CURRENT CHANNELS AND CHERN NUMBERS IN THE INTEGER QUANTUM HALL EFFECT
- Chern number and edge states in the integer quantum Hall effect
- Simultaneous quantization of edge and bulk Hall conductivity
- Spectral Flows of Dilations of Fredholm Operators
- Notes on topological insulators
- K-THEORY AND REALITY
- BOTT PERIODICITY AND THE INDEX OF ELLIPTIC OPERATORS
- Symplectic Bundles and $KR$-Theory.
- Equivariant Contractiblity of the General Linear Group of Hilbert Space
- Notes on twisted equivariant K-theory for C*-algebras
- Spectral flows associated to flux tubes
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