Theorems on shear-free perfect fluids with their Newtonian analogues
arXiv:gr-qc/9702035 · doi:10.1023/A:1018854608416
Abstract
In this paper we provide fully covariant proofs of some theorems on shear-free perfect fluids. In particular, we explicitly show that any shear-free perfect fluid with the acceleration proportional to the vorticity vector (including the simpler case of vanishing acceleration) must be either non-expanding or non-rotating. We also show that these results are not necessarily true in the Newtonian case, and present an explicit comparison of shear-free dust in Newtonian and relativistic theories in order to see where and why the differences appear.
23 pages, LaTeX. Submitted to GRG