Dissipation-Shaped Quantum Geometry in Nonlinear Transport
Abstract
The theory of the intrinsic nonlinear Hall effect, a key probe of quantum geometry, is plagued by conflicting expressions for the conductivity that is independent of the dissipation strength (rate, ). We clarify the origin of this ambiguity by demonstrating that the "intrinsic" response is not universal, but is inextricably linked to the dissipation mechanism that establishes the non-equilibrium steady state (NESS). We establish a benchmark by solving the exact NESS density matrix for a generic Bloch system coupled to a featureless fermionic bath. Our exact conductivity decomposes into two parts: (i) a geometric contribution, , whose form recovers the intraband quantum metric contribution (), providing an exact derivation that clarifies inconsistencies in the literature, and (ii) a novel, purely kinetic contribution, , which is absent when dissipation is modeled by white-noise disorder (e.g., a constant- Green's function model). The discrepancy in between these distinct physical mechanisms is a proof that the nonlinear conductivity is not a unique property of the Bloch Hamiltonian, but is contingent on the physical system-bath coupling.
Keywords
Cite
@article{arxiv.2511.16422,
title = {Dissipation-Shaped Quantum Geometry in Nonlinear Transport},
author = {Zhichao Guo and Xing-Yuan Liu and Hua Wang and Li-kun Shi and Kai Chang},
journal= {arXiv preprint arXiv:2511.16422},
year = {2026}
}
Comments
v2 is PRL's published version