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Simple Three-Integral Scale-Free Galaxy Models

Astrophysics 2015-06-24 v1

Abstract

The Jeans equations give the second moments or stresses required to support a stellar population against the gravity field. A general solution of the Jeans equations for arbitrary axisymmetric scale-free densities in flattened scale-free potentials is given. A two-parameter subset of the solution for the second moments for the self-consistent density of the power-law models, which have exactly spheroidal equipotentials, is examined in detail. In the spherical limit, the potential of these models reduces to that of the singular power-law spheres. We build the physical three-integral distribution functions that correspond to the flattened stellar components. Next, we attack the problem of finding distribution functions associated with the Jeans solutions in flattened scale-free potentials. The third or partial integral introduced by de Zeeuw, Evans and Schwarzschild for Binney's model is generalised to thin and near-thin orbits moving in arbitrary axisymmetric scale-free potentials. The partial integral is a modification of the total angular momentum. For the self-consistent power-law models, we show how this enables the construction of simple three-integral distribution functions. The connexion between these approximate distribution functions and the Jeans solutions is discussed in some detail.

Keywords

Cite

@article{arxiv.astro-ph/9611162,
  title  = {Simple Three-Integral Scale-Free Galaxy Models},
  author = {N. W. Evans and R. M. Häfner and P. T. de Zeeuw},
  journal= {arXiv preprint arXiv:astro-ph/9611162},
  year   = {2015}
}

Comments

14 pages, 7 postscript figures, to appear in Monthly Notices