Amplitudes of Hall field-induced resistance oscillations with a two-harmonic density of states

Abstract

We derive explicit strong-field asymptotics for the normalized differential resistance in Hall field-induced resistance oscillations (HIRO) within the Vavilov-Aleiner-Glazman kinetic framework. For a single-harmonic density of states, the leading oscillation amplitude is set by the full backscattering rate 1/τ(π). Extending the theory to a two-harmonic density of states, we show that the off-diagonal mixed kernel γ12 admits an exact single-integral representation, from which the strong-field asymptotics follow directly. The resulting odd harmonics, notably m=1 and m=3, have coefficients determined by combinations of 1/τ(0) and 1/τ(π), while the leading m=2 amplitude remains unchanged. On exact-kernel mock data generated and fit within the same model, with τ tr and τ in held fixed, the resulting extraction protocol recovers τq, τ(π), and -- when the m=1,3 harmonics are resolved -- τ(0) to sub-percent accuracy, with τ(0) providing a consistency check on the disorder description.