http://arxiv.org/abs/1708.06701
In this work we use the Euler hydrodynamic equations of fluids to study a model of galactic halos minimally coupled to a complex scalar field, which in the Newtonian limit they become the Schr\”odinger-Poisson system. Applying a Madelung transformation, this system of equations takes the form of hydrodynamics equations, where there are a self-interacting potential and a kind of quantum potential that depends non-linearly on the density of the fluid. In this theoretical framework we analyze the Jeans’ instability, which is useful for finding the scale length of perturbations of the scalar field that will form structures. In other words, perturbations of the scalar field with lengths less than this threshold length, can not lead to the formation of galactic structures. We also show that this scalar field hydrodynamic system has vorticity.
M. Rodriguez-Meza and A. Matos
Wed, 23 Aug 17
16/45
Comments: 9 pages, in Spanish
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