Helicity invariants in 3D : kinematical aspects
摘要
Exact, degenerate two-forms on time-extended space R X M which are invariant under the unsteady, incompressible fluid motion on 3D region M are introduced. The equivalence class up to exact one-forms of each potential one-form is splitted by the velocity field. The components of this splitting corresponds to Lagrangian and Eulerian conservation laws for helicity densities. These are expressed as the closure of three-forms which depend on two discrete and a continuous parameter. Each two-form is extended to a symplectic form on R X M. The subclasses of potential one-forms giving rise to Eulerian helicity conservations is shown to result in conformally symplectic structures on R X M. The connection between Lagrangian and Eulerian conservation laws for helicity is shown to be the same as the conformal equivalence of a Poisson bracket algebra to infinitely many local Lie algebra of functions on R X M.
引用
@article{arxiv.math-ph/9812007,
title = {Helicity invariants in 3D : kinematical aspects},
author = {Hasan Gümral},
journal= {arXiv preprint arXiv:math-ph/9812007},
year = {2016}
}
备注
Latex, 33 pages, submitted to Physica D