Combining opposite rhombohedral stacking sequences in graphite produces topological flat bands at their domain interfaces near the K and K' points.
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Quantum geometry in lattice compact scalar fields induces pair-dependent Chern couplings that produce non-identical anyons.
Mean-field theory on a quartic-dispersion Chern band for rhombohedral graphene yields a chiral topological superconductor that transitions to a trivial BEC at T=0; the composite-fermion version realizes a Moore-Read state.
citing papers explorer
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Topological flat bands emerging at the inversion of stacking order in rhombohedral graphite
Combining opposite rhombohedral stacking sequences in graphite produces topological flat bands at their domain interfaces near the K and K' points.
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Non-identical anyon algebras from compact-field quantum geometry
Quantum geometry in lattice compact scalar fields induces pair-dependent Chern couplings that produce non-identical anyons.
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Chiral superconductivity from parent Chern band and its non-Abelian generalization
Mean-field theory on a quartic-dispersion Chern band for rhombohedral graphene yields a chiral topological superconductor that transitions to a trivial BEC at T=0; the composite-fermion version realizes a Moore-Read state.