Abstract
We study the hydrodynamic forces acting on a small impurity moving in a two-dimensional Bose–Einstein condensate at non-zero temperature. The condensate is modelled by the damped-Gross Pitaevskii (dGPE) equation and the impurity by a Gaussian repulsive potential coupled to the condensate. For weak coupling, we obtain analytical expressions for the forces acting on the impurity, and compare them with those computed through direct numerical simulations of the dGPE and with the corresponding expressions for classical forces. For non-steady flows, there is a time-dependent force dominated by inertial effects and which has a correspondence in the Maxey–Riley theory for particles in classical fluids. In the steady-state regime, the force is dominated by a self-induced drag. Unlike at zero temperature, where the drag force vanishes below a critical velocity, at low temperatures the impurity experiences a net drag even at small velocities, as a consequence of the energy dissipation through interactions of the condensate with the thermal cloud. This dissipative force due to thermal drag is similar to the classical Stokes’ drag. There is still a critical velocity above which steady-state drag is dominated by acoustic excitations and behaves non-monotonically with impurity’s speed.
Highlights
The motion of an impurity suspended in a quantum fluid depends on several key factors such as the superfluid nature and flow regime, as well as the size of the impurity and its interaction with the surrounding fluid [1,2,3,4,5]
We study the hydrodynamic forces acting on a small impurity moving in a two-dimensional Bose–Einstein condensate at non-zero temperature
The condensate is modelled by the damped-Gross Pitaevskii equation and the impurity by a Gaussian repulsive potential coupled to the condensate
Summary
Jonas Rønning1, Audun Skaugen2, Emilio Hernández-García3 , Cristobal Lopez3 and Luiza Angheluta1,4 Original content from this work may be used under the terms of the Creative Commons Attribution 4.0 licence. Keywords: Bose Einstein condensate, fluid dynamics, superfluidity, Gross–Pitaevskii equation, particles in fluids Supplementary material for this article is available online Any further distribution of this work must maintain attribution to the author(s) and the title of the work, journal citation and DOI.
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