English

Closed Vortex Filament in a Cylindrical Domain: Circulation Quantization

Quantum Physics 2022-04-07 v2 Fluid Dynamics

Abstract

This article investigates quantum oscillations of a vortex ring with zero thickness that evolves in a cylindrical domain V=D×[0,L]V = D \times [0,L]. The symbol DD denotes the planar domain which is bounded by some closed connected curve SS. The quantization scheme of this dynamical system is based on the approach proposed by the author earlier. As result, we find the discrete values Γn\Gamma_n for circulation Γ\Gamma. In contrast to the traditional approach, where such quantities are usually postulated, the values Γn\Gamma_n are deduced rigorously as the consequence of the conventional scheme of quantum theory. The model demonstrates the splitting of levels also. In particular, the levels correction values depend on the domain VV: both the cylinder height LL and the form of the curve SS affect the final formula for the quantities Γn\Gamma_n. Moreover, we prove that the basic circulation levels demonstrate a "fine structure". These anomalous terms, which are proportional to the value 2\hbar^2, are calculated in the article as well. The conclusions are compared with some results of numerical simulations by other authors.

Keywords

Cite

@article{arxiv.2201.12357,
  title  = {Closed Vortex Filament in a Cylindrical Domain: Circulation Quantization},
  author = {S. V. Talalov},
  journal= {arXiv preprint arXiv:2201.12357},
  year   = {2022}
}

Comments

11 pages

R2 v1 2026-06-24T09:08:01.542Z