Mode-shell correspondence, a unifying phase space theory in topological physics. I: Chiral number of zero-modes
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Publication:6612349
DOI10.21468/scipostphys.17.2.060MaRDI QIDQ6612349
Publication date: 30 September 2024
Published in: SciPost Physics (Search for Journal in Brave)
Partial differential equations on manifolds; differential operators (58Jxx) Applications of statistical mechanics to specific types of physical systems (82Dxx) Applications of quantum theory to specific physical systems (81Vxx)
Cites Work
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- Bulk and boundary invariants for complex topological insulators. From \(K\)-theory to physics
- Bulk-edge correspondence for two-dimensional topological insulators
- Axial anomalies and index theorems on open spaces
- Pseudodifferential operators on supermanifolds and the Atiyah-Singer index theorem
- A short proof of the local Atiyah-Singer index theorem
- Some remarks on the paper of Callias
- The bulk-edge correspondence for disordered chiral chains
- The index of elliptic operators. I
- Topology in shallow-water waves: a violation of bulk-edge correspondence
- The weyl calculus of pseudo-differential operators
- 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
- The noncommutative index theorem and the periodic table for disordered topological insulators and superconductors
- Topological origin of equatorial waves
- Quantized electric multipole insulators
- Topological invariants for interface modes
- Estimating bulk and edge topological indices in finite open chiral chains
- Topological charge conservation for continuous insulators
- Manifestation of the topological index formula in quantum waves and geophysical waves
- Locality of the windowed local density of states
- From ray tracing to waves of topological origin in continuous media
- Restoration of the non-Hermitian bulk-boundary correspondence via topological amplification
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