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arxiv: 2108.04082 · v1 · pith:IERFTV47new · submitted 2021-08-09 · ❄️ cond-mat.mes-hall

Quantum geometry induced second harmonic generation

classification ❄️ cond-mat.mes-hall
keywords quantumgeometrycontributionsgenerationgeometricharmonicinducednon-linear
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Quantum geometry of the electron wave function plays a significant role in the linear and non-linear responses of crystalline materials. Here, we study quantum geometry induced second harmonic generation. We identify non-linear responses stemming from the quantum geometric tensor and the quantum geometric connection in systems with finite Fermi surfaces and disorder. In addition to the injection, shift, and anomalous currents we find two new contributions, which we term double resonant and higher-order pole contributions. Our findings can be tested in state-of-the-art devices in WTe2 (time-reversal symmetric system) and in CuMnAs (parity-time reversal symmetric systems).

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  1. Second-order dc conductivity in the velocity-gauge Keldysh formalism: gauge-invariant decomposition into nonlinear Drude, Berry-curvature-dipole, and quantum-metric responses

    cond-mat.mes-hall 2026-06 unverdicted novelty 6.0

    Derives gauge-invariant decomposition of second-order dc nonlinear conductivity into nonlinear Drude (τ²), Berry-curvature-dipole (τ), and intra/interband quantum-metric-dipole (τ⁰) responses in velocity-gauge Keldysh...