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A Clarification on Quantum‐Metric‐Induced Nonlinear Transport

Xiao‐Bin Qiang, Tianyu Liu, Zi‐Xuan Gao, Hai‐Zhou Lu, Xiang Xie

2025Advanced Science6 citationsDOIOpen Access PDF

Abstract

Over the years, Berry curvature, which is associated with the imaginary part of the quantum geometric tensor, has profoundly impacted many branches of physics. Recently, quantum metric, the real part of the quantum geometric tensor, has been recognized as an indispensable part in comprehensively characterizing the intrinsic properties of condensed matter systems. The intrinsic second-order nonlinear conductivity induced by the quantum metric has attracted significant recent interest. However, its expression varies across the literature. Here, this discrepancy is reconciled by systematically examining the nonlinear conductivity using the standard perturbation theory, the wave packet dynamics, and the Luttinger-Kohn approach. Moreover, inspired by the Dirac model, a toy model is proposed that suppresses the Berry-curvature-induced nonlinear transport, making it suitable for studying the quantum-metric-induced nonlinear conductivity. This work provides a clearer and more unified understanding of the quantum-metric contribution to nonlinear transport. It also establishes a solid foundation for future theoretical developments and experimental explorations in this highly active and rapidly evolving field.

Topics & Concepts

Nonlinear systemQuantumPhysicsPerturbation (astronomy)Statistical physicsMetric (unit)Wave packetPerturbation theory (quantum mechanics)Dirac (video compression format)Classical mechanicsWork (physics)Theoretical physicsMacroscopic quantum phenomenaConductivityFoundation (evidence)Berry connection and curvatureQuantum stateQuantum phasesQuantum processGeometric phaseQuantum mechanicsOpen quantum systemQuantum potentialTopological Materials and PhenomenaThermal properties of materialsQuantum Mechanics and Non-Hermitian Physics
A Clarification on Quantum‐Metric‐Induced Nonlinear Transport | Litcius