Quantum-Geometric Design of Lattice Generalized Landau Levels
Abstract
We design lattice models with tailored quantum geometry, including generalized Landau levels (LLs) satisfying the integrated trace condition and higher-Chern bands with ideal quantum geometry. Our models with N=2, 3, and 4 sublattices include a generalized Haldane model (N=2 honeycomb lattice model) with Gaussian-decaying hoppings realizable in twisted bilayer MoTe2, and N ≥ 3 models with exponentially decaying hoppings. Exact diagonalization reveals fractional Chern insulators in the generalized zeroth LL bands of all three models, a Moore-Read state in the generalized first LL band of the N=4 model, and various interaction-driven topological phasesx2013including integer and fractional anomalous Hall crystals and a multicomponent Halperin statex2013in the ideal higher-Chern band of the N=3 model. Informed by quantum geometry, our work provides a pathway for lattice realizations of Landau-level and beyond-Landau-level physics.
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