48 citations to 10.1007/BF02101600 (Crossref Cited-By Service)
  1. Enej Ilievski, Jacopo De Nardis, “Microscopic Origin of Ideal Conductivity in Integrable Quantum Models”, Phys. Rev. Lett., 119, no. 2, 2017, 020602  crossref
  2. I. V. Krasovsky, “Bloch Electron in a Magnetic Field and the Ising Model”, Phys. Rev. Lett., 85, no. 23, 2000, 4920  crossref
  3. HANS KOCH, “Asymptotic scaling and universality for skew products with factors in SL(2,)”, Ergod. Th. Dynam. Sys., 43, no. 5, 2023, 1594  crossref
  4. Shao-Shiung Lin, Shi-Shyr Roan, “Algebraic geometry approach to the Bethe equation for Hofstadter-type models”, J. Phys. A: Math. Gen., 35, no. 28, 2002, 5907  crossref
  5. E Ilievski, “Popcorn Drude weights from quantum symmetry”, J. Phys. A: Math. Theor., 55, no. 50, 2022, 504005  crossref
  6. Indubala I Satija, Jukka A Ketoja, “Fractal characteristics of critical and localized states in incommensurate quantum systems”, Pramana - J Phys, 48, no. 2, 1997, 589  crossref
  7. Yasuyuki Hatsuda, Yuji Sugimoto, Zhaojie Xu, “Calabi-Yau geometry and electrons on 2d lattices”, Phys. Rev. D, 95, no. 8, 2017, 086004  crossref
  8. E Papp, C Micu, “Symmetry properties of exact energy solutions to the Harper equation and relatedq-normalizations”, J. Phys. A: Math. Gen., 33, no. 37, 2000, 6615  crossref
  9. Min-Fong Yang, “Azbel-Hofstadter model on the triangular lattice revisited”, Phys. Rev. B, 64, no. 8, 2001, 081101  crossref
  10. Andrzej Wal, “Energy bands for finite two-dimensional systems in a quantised magnetic field: the symmetry of the model”, J Math Chem, 51, no. 9, 2013, 2285  crossref
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