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Linear and nonlinear edge dynamics of trapped fractional quantum Hall droplets

Alberto Nardin, Iacopo Carusotto

2023Physical review. A/Physical review, A13 citationsDOI

Abstract

We report numerical studies of the linear and nonlinear edge dynamics of a non-harmonically-confined macroscopic fractional quantum Hall fluid. In the long-wavelength and weak excitation limit, observable consequences of the fractional transverse conductivity are recovered. The first nonuniversal corrections to the chiral Luttinger liquid theory are then characterized: for a weak excitation in the linear response regime, cubic corrections to the linear wave dispersion and a broadening of the dynamical structure factor of the edge excitations are identified; for stronger excitations, sizable nonlinear effects are found in the dynamics. The numerically observed features are quantitatively captured by a nonlinear chiral Luttinger liquid quantum Hamiltonian that reduces to a driven Korteweg--de Vries equation in the semiclassical limit. Experimental observability of our predictions is finally discussed.

Topics & Concepts

Quantum Hall effectNonlinear systemPhysicsFractional quantum Hall effectDynamics (music)Enhanced Data Rates for GSM EvolutionQuantum mechanicsCondensed matter physicsQuantum spin Hall effectClassical mechanicsStatistical physicsElectronTelecommunicationsComputer scienceAcousticsQuantum and electron transport phenomenaQuantum Information and CryptographyCold Atom Physics and Bose-Einstein Condensates
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