The Zak phase in topologically insulating chains: invariants and limitations
Pith reviewed 2026-05-15 10:35 UTC · model grok-4.3
The pith
Zak phase defines Z2 invariant for 1D insulators but vanishes in classes with quaternionic symmetry
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We define a Z2-valued topological invariant I^(AZC-class)(H) obtained from the abelian Zak phase. Moreover, we demonstrate that in symmetry classes admitting a quaternionic structure, i.e. anti-unitary symmetries squaring to minus the identity, the Zak phase is further constrained, leading to the vanishing of the Z2 invariant mentioned above. This highlights the sensitivity of the Zak phase to additional geometric structures of the manifold of occupied energy states, as well as its limitations in being an effective marker for topological phases of insulating chains.
What carries the argument
Symmetric Bloch bases adapted to discrete symmetries of fibered Hamiltonians and spectral projections, from which the abelian Zak phase yields the Z2 invariant I^(AZC-class)(H)
If this is right
- In non-quaternionic AZC classes the Z2 invariant extracted from the Zak phase classifies topological phases of the chain.
- In generalized Kitaev models the Zak phase captures only partial information about phases with arbitrary finite-range hopping or multiple chiral channels.
- Whenever an anti-unitary symmetry squares to minus the identity the Z2 invariant is identically zero.
- The Zak phase therefore cannot serve as a complete topological marker in all 1D symmetry-protected insulating phases.
Where Pith is reading between the lines
- The same geometric constraint may force other phase-based invariants to vanish in higher-dimensional systems that possess quaternionic structure.
- Complete classification of 1D chains may require supplementing the Zak phase with winding numbers or other invariants that survive the quaternionic case.
- The result raises the question of whether similar vanishing occurs for the Zak phase in disordered or interacting versions of these chains.
Load-bearing premise
Symmetric Bloch bases can be constructed that are adapted to all discrete symmetries of the Hamiltonian.
What would settle it
An explicit 1D Hamiltonian in a quaternionic symmetry class whose computed Zak phase produces a non-vanishing Z2 invariant would disprove the vanishing claim.
read the original abstract
In this work we investigate the topological content of the Zak phase in one-dimensional translation-invariant topological insulators endowed with time-reversal, particle-hole and/or chiral symmetries, extending results from \cite{Monaco_2023}. We analyze the extent to which the Zak phase captures the topology of all Altland--Zirnbauer--Cartan (AZC) symmetry classes in $1$D. Building on the framework of fibered Hamiltonians and spectral projections, we construct symmetric Bloch bases adapted to the discrete symmetries of the system and define a $\mathbb{Z}_2$-valued topological invariant $\mathrm{I}^{(\mathrm{AZC-class})}(H)$ obtained from the abelian Zak phase. Moreover, we demonstrate that in symmetry classes admitting a quaternionic structure, i.e. anti-unitary symmetries squaring to minus the identity, the Zak phase is further constrained, leading to the vanishing of the $\mathbb{Z}_2$ invariant mentioned above. This highlights the sensitivity of the Zak phase to additional geometric structures of the manifold of occupied energy states, as well as its limitations in being an effective marker for topological phases of insulating chains. As an example, we discuss the case of generalized Kitaev chains with arbitrary finite-range hopping and single or multiple chiral channels, and show how the Zak phase only retains partial information about their different topological phases.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript extends prior work on fibered Hamiltonians to 1D translation-invariant insulators in AZC symmetry classes. It constructs symmetric Bloch bases adapted to time-reversal, particle-hole and chiral symmetries, defines a Z2-valued invariant I^(AZC-class)(H) extracted from the abelian Zak phase, proves that this invariant vanishes in classes admitting a quaternionic structure, and illustrates the partial topological information retained by the Zak phase via generalized Kitaev chains with arbitrary-range hopping.
Significance. If the global construction of symmetry-adapted bases is valid, the work supplies a concrete Z2 marker derived from the Zak phase and demonstrates its forced vanishing under quaternionic constraints, thereby clarifying geometric limitations of the Zak phase as a topological diagnostic in 1D. The Kitaev-chain example further shows how the invariant distinguishes only a subset of phases, which is a useful negative result for the field.
major comments (2)
- [Construction of symmetric Bloch bases (fibered-Hamiltonian framework)] The global existence of continuous symmetric Bloch bases over the full Brillouin zone S^1 is asserted without proof when the occupied-state bundle is non-trivial. For a non-trivial line bundle (non-zero winding or Z2 index), no globally continuous section exists; the transition functions on overlaps may alter the accumulated Zak phase, rendering I^(AZC-class)(H) either ill-defined or basis-dependent. This assumption is load-bearing for both the definition of the invariant and the vanishing claim in quaternionic classes.
- [Vanishing result for quaternionic classes] The vanishing of I^(AZC-class)(H) in classes with anti-unitary symmetries squaring to -1 is stated to follow from the quaternionic structure, yet the argument appears to presuppose that the adapted bases can be chosen globally precisely when the topology is non-trivial. An explicit computation of the transition functions or a homotopy argument showing that the Zak phase is forced to zero independently of local choices is required.
minor comments (2)
- [Kitaev-chain example] In the generalized Kitaev-chain example, specify the precise relation between the number of chiral channels and the possible values of the Zak phase; the statement that it 'retains only partial information' would benefit from an explicit table comparing the Z2 invariant against the full topological classification.
- [Preliminaries] Notation for the fibered Hamiltonian and spectral projections should be cross-referenced to the earlier Monaco_2023 framework to avoid ambiguity in the definition of the abelian Zak phase.
Simulated Author's Rebuttal
We thank the referee for the careful reading of our manuscript and for identifying these key points that require clarification. We address each major comment below and will incorporate the suggested improvements in a revised version.
read point-by-point responses
-
Referee: [Construction of symmetric Bloch bases (fibered-Hamiltonian framework)] The global existence of continuous symmetric Bloch bases over the full Brillouin zone S^1 is asserted without proof when the occupied-state bundle is non-trivial. For a non-trivial line bundle (non-zero winding or Z2 index), no globally continuous section exists; the transition functions on overlaps may alter the accumulated Zak phase, rendering I^(AZC-class)(H) either ill-defined or basis-dependent. This assumption is load-bearing for both the definition of the invariant and the vanishing claim in quaternionic classes.
Authors: We agree that the global construction requires a more explicit justification. Building on the fibered-Hamiltonian framework of our prior work, the symmetric Bloch bases are defined locally on an open cover of the Brillouin zone S^1, with transition functions fixed by the action of the discrete symmetries (time-reversal, particle-hole, and chiral). The abelian Zak phase is extracted from the determinant line bundle of the occupied states, and the Z2 invariant I^(AZC-class)(H) is defined via the parity of this phase; changes induced by transition functions contribute multiples of 2π that preserve the Z2 value. To strengthen the manuscript we will add a dedicated subsection that (i) recalls the local construction, (ii) computes the effect of symmetry-constrained transition functions on the integrated Berry connection, and (iii) proves that the resulting Z2 invariant is independent of the choice of local bases even when the underlying bundle is topologically non-trivial. revision: yes
-
Referee: [Vanishing result for quaternionic classes] The vanishing of I^(AZC-class)(H) in classes with anti-unitary symmetries squaring to -1 is stated to follow from the quaternionic structure, yet the argument appears to presuppose that the adapted bases can be chosen globally precisely when the topology is non-trivial. An explicit computation of the transition functions or a homotopy argument showing that the Zak phase is forced to zero independently of local choices is required.
Authors: The vanishing is a direct consequence of the quaternionic structure induced by any anti-unitary symmetry that squares to -1. This structure equips the occupied bundle with a compatible quaternionic multiplication that forces the Berry connection to satisfy an additional reality condition; integrating this connection over S^1 then yields a Zak phase whose parity is necessarily even. We will supply the missing explicit computation by evaluating the transition functions under the quaternionic action and showing that they contribute an even multiple to the total phase. As an alternative perspective we will also sketch a homotopy argument: any Hamiltonian in a quaternionic class can be continuously deformed, within the symmetry class, to a trivial reference Hamiltonian while preserving the quaternionic structure, and the invariant remains zero throughout the deformation. These additions will make the independence from local choices fully transparent. revision: yes
Circularity Check
No significant circularity; derivation self-contained beyond prior framework
full rationale
The paper extends the fibered-Hamiltonian setting from the authors' prior work but defines the new Z2 invariant I^(AZC-class)(H) directly from the abelian Zak phase after constructing symmetry-adapted Bloch bases; the vanishing result in quaternionic classes follows from the anti-unitary symmetry assumptions (squaring to -1) rather than reducing to a fit, self-definition, or unverified self-citation chain. No equation or step equates the output invariant to its input by construction, and the 1D Zak phase computation remains independently falsifiable via explicit models such as the generalized Kitaev chains. The cited framework supplies the technical language but does not force the specific Z2 claim or its vanishing.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption Existence of symmetric Bloch bases adapted to time-reversal, particle-hole and chiral symmetries
- domain assumption The Zak phase remains abelian under the symmetry constraints considered
invented entities (1)
-
Z2-valued topological invariant I^(AZC-class)(H)
no independent evidence
Lean theorems connected to this paper
-
IndisputableMonolith/Foundation/AlexanderDuality.leanalexander_duality_circle_linking unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
we construct symmetric Bloch bases adapted to the discrete symmetries of the system and define a Z2-valued topological invariant I^(AZC-class)(H) obtained from the abelian Zak phase
What do these tags mean?
- matches
- The paper's claim is directly supported by a theorem in the formal canon.
- supports
- The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
- extends
- The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
- uses
- The paper appears to rely on the theorem as machinery.
- contradicts
- The paper's claim conflicts with a theorem or certificate in the canon.
- unclear
- Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.
Reference graph
Works this paper leans on
-
[1]
Simons.Condensed Matter Field Theory
Alexander Altland and Ben D. Simons.Condensed Matter Field Theory. Cambridge University Press, 2nd edition, 2010. i i “ATMP” — 2026/4/28 — 1:59 — page 43 — #43 i i i i i i The Zak phase in topologically insulating chains 43
work page 2010
- [2]
-
[3]
Topological insulator materials.Journal of the Physical Society of Japan, 82(10):102001, 2013
Yoichi Ando. Topological insulator materials.Journal of the Physical Society of Japan, 82(10):102001, 2013
work page 2013
-
[4]
Zak phase and bulk-boundary correspondence in a generalized Dirac–Kronig– Penney model
Giuliano Angelone, Domenico Monaco, and Gabriele Peluso. Zak phase and bulk-boundary correspondence in a generalized Dirac–Kronig– Penney model. Preprint arXiv:2602.03378, 2026
-
[5]
Neil W. Ashcroft and N. David Mermin.Solid state physics. Holt, Rinehart and Winston, New York, NY, 1976
work page 1976
-
[6]
Barreiro, Dmitry Abanin, Takuya Kitagawa, Eugene Demler, and Immanuel Bloch
Marcos Atala, Monika Aidelsburger, Julio T. Barreiro, Dmitry Abanin, Takuya Kitagawa, Eugene Demler, and Immanuel Bloch. Direct mea- surement of the Zak phase in topological Bloch bands.Nature Physics, 9(12):795–800, 2013
work page 2013
-
[7]
Sven Bachmann, Alex Bols, Wojciech De Roeck, and Martin Fraas. A many-body index for quantum charge transport.Communications in Mathematical Physics, 375(2):1249–1272, 2020
work page 2020
-
[8]
Many-body Fu–Kane–Mele index.Communications in Mathematical Physics, 406(9):213, 2025
Sven Bachmann, Alex Bols, and Mahsa Rahnama. Many-body Fu–Kane–Mele index.Communications in Mathematical Physics, 406(9):213, 2025
work page 2025
-
[9]
The index of a pair of pure states and the interacting integer quantum Hall effect
Sven Bachmann, Jacob Shapiro, and Clément Tauber. The index of a pair of pure states and the interacting integer quantum Hall effect. In Forum of Mathematics, Sigma, volume 14, page e10. Cambridge Uni- versity Press, 2026
work page 2026
-
[10]
B. Andrei Bernevig and Taylor L. Hughes.Topological Insulators and Topological Superconductors. Princeton University Press, 2013
work page 2013
-
[11]
Brian Harold Bransden and Charles Jean Joachain.Physics of Atoms and Molecules. Pearson Education, 2003
work page 2003
-
[12]
Léon Brillouin. Les électrons libres dans les métaux et le role des réflex- ions de Bragg.Journal de Physique et le Radium, 1:377–400, 1930
work page 1930
-
[13]
Ching-Kai Chiu, Jeffrey C. Y. Teo, Andreas P. Schnyder, and Shinsei Ryu. Classification of topological quantum matter with symmetries. Reviews of Modern Physics, 88(3):035005, 2016. i i “ATMP” — 2026/4/28 — 1:59 — page 44 — #44 i i i i i i 44 Federico Manzoni, Domenico Monaco, Gabriele Peluso
work page 2016
-
[14]
Topological classification of insu- lators: II
Jui-Hui Chung and Jacob Shapiro. Topological classification of insu- lators: II. Quasi-two-dimensional locality. Preprint arXiv:2406.05385, 2024
-
[15]
Topological classification of insu- lators: I
Jui-Hui Chung and Jacob Shapiro. Topological classification of insu- lators: I. Non-interacting spectrally-gapped one-dimensional systems. Advances in Mathematics, 480:110486, 2025
work page 2025
-
[16]
Jui-Hui Chung and Jacob Shapiro. Topological classification of insula- tors: III. Non-interacting spectrally-gapped systems in all dimensions. Preprint arXiv:2602.12512, 2026
work page internal anchor Pith review Pith/arXiv arXiv 2026
-
[17]
Cornean, Domenico Monaco, and Stefan Teufel
Horia D. Cornean, Domenico Monaco, and Stefan Teufel. Wannier func- tions andZ 2 invariants in time-reversal symmetric topological insula- tors.Reviews in Mathematical Physics, 29, 2017
work page 2017
-
[18]
Maurice A. De Gosson.Symplectic methods in harmonic analysis and in mathematical physics, volume 7 ofPseudo-Differential Operators. Springer Science & Business Media, 2011
work page 2011
-
[19]
Construc- tion of real-valued localized composite Wannier functions for insulators
Domenico Fiorenza, Domenico Monaco, and Gianluca Panati. Construc- tion of real-valued localized composite Wannier functions for insulators. Annales Henri Poincaré, 17(1):63–97, 2016
work page 2016
-
[20]
Domenico Fiorenza, Domenico Monaco, and Gianluca Panati.Z 2 in- variants of topological insulators as geometric obstructions.Communi- cations in Mathematical Physics, 343(3), 2016
work page 2016
-
[21]
Daniel S. Freed and Gregory W. Moore. Twisted equivariant matter. Annales Henri Poincaré, 14(8):1927–2023, 2013
work page 1927
-
[22]
Giuliani and Giovanni Vignale.Quantum Theory of the Electron Liquid
Gabriele F. Giuliani and Giovanni Vignale.Quantum Theory of the Electron Liquid. Cambridge University Press, 2005
work page 2005
-
[23]
C. M. Goringe, D. R. Bowler, and E. Hernández. Tight-binding mod- elling of materials.Reports on Progress in Physics, 60(12):1447–1512, December 1997
work page 1997
-
[24]
Gian Michele Graf and Marcello Porta. Bulk-edge correspondence for two-dimensional topological insulators.Communications in Mathemat- ical Physics, 324(3):851–895, 2013
work page 2013
-
[25]
Gian Michele Graf and Jacob Shapiro. The bulk-edge correspondence for disordered chiral chains.Communications in Mathematical Physics, 363(3):829–846, 2018. i i “ATMP” — 2026/4/28 — 1:59 — page 45 — #45 i i i i i i The Zak phase in topologically insulating chains 45
work page 2018
-
[26]
Julian Großmann and Hermann Schulz-Baldes. Index pairings in pres- ence of symmetries with applications to topological insulators.Commu- nications in Mathematical Physics, 343(2):477–513, 2016
work page 2016
-
[27]
M. Zahid Hasan and Charles L. Kane. Colloquium: Topological insula- tors.Reviews of Modern Physics, 82, 2010
work page 2010
- [28]
-
[29]
Dale Husemoller.Fibre Bundles, volume 20 ofGraduate Texts in Math- ematics. Springer, 3rd edition, 1994
work page 1994
-
[30]
Springer-Verlag, 2nd edition, 1995
Tosio Kato.Perturbation Theory for Linear Operators, volume 132 of Classics in Mathematics. Springer-Verlag, 2nd edition, 1995
work page 1995
-
[31]
Homotopy theory of strong and weak topological insulators.Physical Review B, 91(24):245148, 2015
Ricardo Kennedy and Charles Guggenheim. Homotopy theory of strong and weak topological insulators.Physical Review B, 91(24):245148, 2015
work page 2015
-
[32]
Periodic table for topological insulators and supercon- ductors.AIP Conference Proceedings, 2009
Alexei Kitaev. Periodic table for topological insulators and supercon- ductors.AIP Conference Proceedings, 2009
work page 2009
-
[33]
Alexei Y. Kitaev. Unpaired Majorana fermions in quantum wires. Physics-Uspekhi, 44(10S), 2001
work page 2001
-
[34]
Peter Kuchment. An overview of periodic elliptic operators.Bulletin of the American Mathematical Society, 53(3):343–414, 2016
work page 2016
- [35]
-
[36]
Andreas W. W. Ludwig, Hermann Schulz-Baldes, and Michael Stolz. Lyapunov spectra for all ten symmetry classes of quasi-one-dimensional disordered systems of non-interacting fermions.Journal of Statistical Physics, 152:275–304, 2013
work page 2013
-
[37]
Gerald D. Mahan.Many-Particle Physics. Springer, 3rd edition, 2000
work page 2000
- [38]
-
[39]
Margine, Nicola Marzari, Arash A
Antimo Marrazzo, Sophie Beck, Elena R. Margine, Nicola Marzari, Arash A. Mostofi, Junfeng Qiao, Ivo Souza, Stepan S. Tsirkin, Jonathan R. Yates, and Giovanni Pizzi. Wannier-function software ecosystem for materials simulations.Reviews of Modern Physics, i i “ATMP” — 2026/4/28 — 1:59 — page 46 — #46 i i i i i i 46 Federico Manzoni, Domenico Monaco, Gabriel...
work page 2026
-
[40]
Domenico Monaco and Gianluca Panati. Symmetry and localization in periodic crystals: Triviality of Bloch bundles with a fermionic time- reversal symmetry.Acta Applicandae Mathematicae, 137(1):185–203, December 2014
work page 2014
-
[41]
Domenico Monaco, Gianluca Panati, Adriano Pisante, and Stefan Teufel. Optimal decay of Wannier functions in Chern and quantum Hall insulators.Communications in Mathematical Physics, 359(1):61– 100, January 2018
work page 2018
-
[42]
Domenico Monaco and Gabriele Peluso. AZ2 invariant for chiral and particle-hole symmetric topological chains.Journal of Mathematical Physics, 64(4):041904, April 2023
work page 2023
-
[43]
Topology vs localization in synthetic dimensions.Journal of Mathematical Physics, 64(1):011902, 2023
Domenico Monaco and Thaddeus Roussigné. Topology vs localization in synthetic dimensions.Journal of Mathematical Physics, 64(1):011902, 2023
work page 2023
-
[44]
Arash A. Mostofi, Jonathan R. Yates, Young-Su Lee, Ivo Souza, David Vanderbilt, and Nicola Marzari. wannier90: A tool for obtaining maximally-localised Wannier functions.Computer Physics Communi- cations, 178(9):685–699, 2008
work page 2008
-
[45]
Takashi Oka and Sota Kitamura. Floquet engineering of quantum ma- terials.Annual Review of Condensed Matter Physics, 10:387–408, 2019
work page 2019
-
[46]
Triviality of Bloch and Bloch–Dirac bundles.Annales Henri Poincaré, 8(5):995–1011, 2007
Gianluca Panati. Triviality of Bloch and Bloch–Dirac bundles.Annales Henri Poincaré, 8(5):995–1011, 2007
work page 2007
-
[47]
Gianluca Panati and Adriano Pisante. Bloch bundles, Marzari- Vanderbilt functional and maximally localized Wannier functions.Com- munications in Mathematical Physics, 322(3):835–875, 2013
work page 2013
-
[48]
PhD thesis, Sapienza University of Rome, 2026
Gabriele Peluso.Unitary and homotopy equivalences: classification of low-dimensional topological phases of quantum matter. PhD thesis, Sapienza University of Rome, 2026
work page 2026
-
[49]
Splitting obstructions and invariants in time-reversal symmetric topological insu- lators
Gabriele Peluso, Domenico Monaco, and Alessandro Ferreri. Splitting obstructions and invariants in time-reversal symmetric topological insu- lators. Preprint arXiv:2511.10444, 2025
-
[50]
Michael E. Peskin and Daniel V. Schroeder.An Introduction to Quan- tum Field Theory. Addison-Wesley, Reading, USA, 1995. i i “ATMP” — 2026/4/28 — 1:59 — page 47 — #47 i i i i i i The Zak phase in topologically insulating chains 47
work page 1995
- [51]
-
[52]
Michael Reed and Barry Simon.Methods of Modern Mathematical Physics. IV Analysis of Operators. Academic Press, 1978
work page 1978
-
[53]
Raffaele Resta. Macroscopic polarization in crystalline dielectrics: The geometric phase approach.Reviews of Modern Physics, 66(3), 1994
work page 1994
-
[54]
Schnyder, Akira Furusaki, and Andreas W
Shinsei Ryu, Andreas P. Schnyder, Akira Furusaki, and Andreas W. W. Ludwig. Topological insulators and superconductors: tenfold way and dimensionalhierarchy.New Journal of Physics,12(6):065010,June2010
-
[55]
Filippo Santi.On Moving Quantum Pumps and Symmetric Topologi- cal Phases: Two Problems in Mathematical Physics. PhD thesis, ETH Zurich, 2026
work page 2026
-
[56]
The topology of mobility-gapped insulators.Letters in Mathematical Physics, 110(10):2703–2723, 2020
Jacob Shapiro. The topology of mobility-gapped insulators.Letters in Mathematical Physics, 110(10):2703–2723, 2020
work page 2020
-
[57]
Manish Mani Sharma, Prince Sharma, Navneet Kumar Karn, and V. P. S. Awana. A comprehensive review on topological superconduct- ing materials and interfaces.Superconductor Science and Technology, 35(8):083003, 2022
work page 2022
-
[58]
John C. Slater and George F. Koster. Simplified LCAO method for the periodic potential problem.Physical Review, 94:1498–1524, Jun 1954
work page 1954
-
[59]
Horst L. Stormer, Daniel C. Tsui, and Arthur C. Gossard. The fractional quantum Hall effect.Reviews of Modern Physics, 71:S298–S305, Mar 1999
work page 1999
-
[60]
Number 72 in Mathematical Surveys and Monographs
Gerald Teschl.Jacobi operators and completely integrable nonlinear lat- tices. Number 72 in Mathematical Surveys and Monographs. American Mathematical Society, 2000
work page 2000
-
[61]
Guo Chuan Thiang. Topological phases: isomorphism, homotopy and k- theory.International Journal of Geometric Methods in Modern Physics, 12(09):1550098, 2015
work page 2015
-
[62]
Guo Chuan Thiang. On the k-theoretic classification of topological phases of matter.Annales Henri Poincaré, 17(4):757–794, 2016
work page 2016
-
[63]
David J. Thouless, Mahito Kohmoto, M. Peter Nightingale, and Marcel den Nijs. Quantized Hall conductance in a two-dimensional periodic i i “ATMP” — 2026/4/28 — 1:59 — page 48 — #48 i i i i i i 48 Federico Manzoni, Domenico Monaco, Gabriele Peluso potential.Physical Review Letters, 49(6):405, 1982
work page 2026
-
[64]
The quantized Hall effect.Reviews of Modern Physics, 58:519–531, 1986
Klaus von Klitzing. The quantized Hall effect.Reviews of Modern Physics, 58:519–531, 1986
work page 1986
-
[65]
Steven Weinberg.The Quantum Theory of Fields. Vol. 1: Foundations. Cambridge University Press, 6 2005
work page 2005
-
[66]
Berry phase effects on elec- tronic properties.Reviews of Modern Physics, 82(3):1959–2007, 2010
Di Xiao, Ming-Che Chang, and Qian Niu. Berry phase effects on elec- tronic properties.Reviews of Modern Physics, 82(3):1959–2007, 2010
work page 1959
-
[67]
Higher-order band topology.Nature Reviews Physics, 3:520–532, 2021
Biye Xie, Hai-Xiao Wang, Xiujuan Zhang, Peng Zhan, Jian-Hua Jiang, Minghui Lu, and Yanfeng Chen. Higher-order band topology.Nature Reviews Physics, 3:520–532, 2021
work page 2021
-
[68]
Joshua Zak. Berry’s phase for energy bands in solids.Physical Review Letters, 62(23):2747–2750, 1989. (F. Manzoni) Dipartimento di Fisica e Matematica, Università degli Studi Roma Tre Via della Vasca Navale 84, 00146 Roma (Italy) E-mail address:federico.manzoni@uniroma3.it (D.Monaco)DipartimentodiMatematica“GuidoCastelnuovo”,Sapienza Università di Roma Pi...
work page 1989
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