2013
DOI: 10.1103/physrevb.88.121406
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Bulk-boundary correspondence for chiral symmetric quantum walks

Abstract: Discrete-time quantum walks (DTQW) have topological phases that are richer than those of time-independent lattice Hamiltonians. Even the basic symmetries, on which the standard classification of topological insulators hinges, have not yet been properly defined for quantum walks. We introduce the key tool of time frames, i.e., we describe a DTQW by the ensemble of time-shifted unitary time-step operators belonging to the walk. This gives us a way to consistently define chiral symmetry (CS) for DTQW's. We show t… Show more

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Cited by 249 publications
(349 citation statements)
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(52 reference statements)
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“…We remark that for a periodically driven particle-hole symmetric Hamiltonian, the symmetry is inherited by the effective Hamiltonian in all time frames [34]. To see chiral symmetry of a quantum walk explicitly, it is necessary to go to a chiral symmetric time frame [28]. In the case of the split-step walk, there are two such time frames, specified by Eqs.…”
Section: B Symmetries and Topological Phasesmentioning
confidence: 99%
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“…We remark that for a periodically driven particle-hole symmetric Hamiltonian, the symmetry is inherited by the effective Hamiltonian in all time frames [34]. To see chiral symmetry of a quantum walk explicitly, it is necessary to go to a chiral symmetric time frame [28]. In the case of the split-step walk, there are two such time frames, specified by Eqs.…”
Section: B Symmetries and Topological Phasesmentioning
confidence: 99%
“…The split-step walk has both particle-hole symmetry, represented by complex conjugation K, and chiral symmetry, which places the system in Cartan class BDI [28]. To see particle-hole symmetry of the quantum walk, note that all matrix elements of the time-step operator U (θ 1 ,θ 2 ) are real (in a position and σ z basis).…”
Section: B Symmetries and Topological Phasesmentioning
confidence: 99%
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