On the Small Mass Limit of Quantum Brownian Motion with Inhomogeneous Damping and Diffusion

Abstract

We study the small mass limit (or: the Smoluchowski-Kramers limit) of a class of quantum Brownian motions with inhomogeneous damping and diffusion. For Ohmic bath spectral density with a Lorentz-Drude cutoff, we derive the Heisenberg-Langevin equations for the particle's observables using a quantum stochastic calculus approach. We set the mass of the particle to equal m = m0 ε, the reduced Planck constant to equal = ε and the cutoff frequency to equal = E/ε, where m0 and E are positive constants, so that the particle's de Broglie wavelength and the largest energy scale of the bath are fixed as ε 0. We study the limit as ε 0 of the rescaled model and derive a limiting equation for the (slow) particle's position variable. We find that the limiting equation contains several drift correction terms, the quantum noise-induced drifts, including terms of purely quantum nature, with no classical counterparts.