We investigate the evolution equation for the average vortex length per unit volume L of superfluid turbulence in inhomogeneous flows. Inhomogeneities in line density L and in counterflow velocity V may contribute to vortex diffusion, vortex formation and vortex destruction. We explore two different families of contributions: those arising from a second order expansion of the Vinen equation itself, and those which are not related to the original Vinen equation but must be stated by adding to it second-order terms obtained from dimensional analysis or other physical arguments.
Saluto, L., Mongiovi', M. (2016). Inhomogeneous vortex tangles in counterflow superfluid turbulence: flow in convergent channels. COMMUNICATIONS IN APPLIED AND INDUSTRIAL MATHEMATICS, 7(2), 130-149 [10.1515/caim-2016-0010].
Inhomogeneous vortex tangles in counterflow superfluid turbulence: flow in convergent channels
SALUTO, Lidia;MONGIOVI', Maria Stella
2016-01-01
Abstract
We investigate the evolution equation for the average vortex length per unit volume L of superfluid turbulence in inhomogeneous flows. Inhomogeneities in line density L and in counterflow velocity V may contribute to vortex diffusion, vortex formation and vortex destruction. We explore two different families of contributions: those arising from a second order expansion of the Vinen equation itself, and those which are not related to the original Vinen equation but must be stated by adding to it second-order terms obtained from dimensional analysis or other physical arguments.
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