Exact diagonalization provides evidence that the antiferromagnetic Chern insulator phase with quantized Chern number C=1 exists in the Kane-Mele-Hubbard model, shown by gap closing, anisotropic spin correlations, fidelity susceptibility, and a modified Chern number calculation that accounts for TRS-
Rachel, Interacting topological insulators: a review, Rep
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Band inversion between orbital doublet and isolated orbital creates interaction-shielded QBCP gapped by intrinsic SOC, enabling robust QAH in proposed MNX2 monolayers.
This is a review summarizing existing extensions of the SSH model to higher dimensions, larger unit cells, and additional terms, with case studies of their topological properties.
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The antiferromagnetic Chern insulator phase in the Kane-Mele-Hubbard model
Exact diagonalization provides evidence that the antiferromagnetic Chern insulator phase with quantized Chern number C=1 exists in the Kane-Mele-Hubbard model, shown by gap closing, anisotropic spin correlations, fidelity susceptibility, and a modified Chern number calculation that accounts for TRS-
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Revisiting quadratic band crossing: from interaction-driven instability to intrinsic topology
Band inversion between orbital doublet and isolated orbital creates interaction-shielded QBCP gapped by intrinsic SOC, enabling robust QAH in proposed MNX2 monolayers.
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Exploring topological phases with extended Su-Schrieffer-Heeger models
This is a review summarizing existing extensions of the SSH model to higher dimensions, larger unit cells, and additional terms, with case studies of their topological properties.