2017
DOI: 10.1103/physrevb.95.161114
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Measuring topological invariants from generalized edge states in polaritonic quasicrystals

Abstract: We investigate the topological properties of Fibonacci quasicrystals using cavity polaritons. Composite structures made of the concatenation of two Fibonacci sequences allow investigating generalized edge states forming in the gaps of the fractal energy spectrum. We employ these generalized edge states to determine the topological invariants of the quasicrystal. When varying a structural degree of freedom (phason) of the Fibonacci sequence, the edge states spectrally traverse the gaps, while their spatial symm… Show more

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Cited by 95 publications
(85 citation statements)
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“…In Appendix D we provide more details about the derivation of this estimation. In a recent experiment with a setup similar to ours, a standard deviation of about 30µeV for the disorder potential was reported [55], a factor of about 10 larger than required for our estimations. However, given that the origin of the Beliaev-Landau peaks is different in nature than the disorder background, there are two additional strategies one can employ to isolate them.…”
Section: Experimental Signatures Of Beliaev-landau Scatteringsmentioning
confidence: 63%
“…In Appendix D we provide more details about the derivation of this estimation. In a recent experiment with a setup similar to ours, a standard deviation of about 30µeV for the disorder potential was reported [55], a factor of about 10 larger than required for our estimations. However, given that the origin of the Beliaev-Landau peaks is different in nature than the disorder background, there are two additional strategies one can employ to isolate them.…”
Section: Experimental Signatures Of Beliaev-landau Scatteringsmentioning
confidence: 63%
“…Figure 7 shows that scanning the angular degree of freedom φ in (35) does not change the spectral locations of neither the bands nor the gaps, but significantly affects the spectral location of the gap states. Such a behaviour has been shown to be directly related to the topological (Chern) invariants ascribed to each gap [26,31,32]. Now, we show how to obtain and characterise these states using the effective Fabry-Perot model (20) (see also Fig.…”
Section: Gap States In a Fibonacci Quasicrystalmentioning
confidence: 99%
“…The artificial palindrome indeed plays the role of a generalized edge, hosting gap states of both spatial symmetries (with respect to the mid-cavity coordinate). This additional characterisation of gap states has been proposed to probe topological properties of spectral gaps in quasiperiodic chains [32]. To emphasize the generality of this generalised Fabry-Perot approach, and to illustrate the common origin of all gap states, we consider a single Fibonacci segment with a single structural defect (in this case an additional "A" layer inserted within the structure).…”
Section: Gap States In a Fibonacci Quasicrystalmentioning
confidence: 99%
“…Formed from the strong coupling of photons in an electromagnetic microcavity and excitons within a semiconductor, excitonpolaritons [2] and their condensation at high temperatures are by now a well-established experimental milestone [3][4][5][6]. These objects have generated continued interest in such applications as quantum simulation of solid state physics [7][8][9][10], acoustic black hole physics [11], and the study of topological properties of quasicrystal states [12].…”
mentioning
confidence: 99%