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| In regions of both positive and negative mass density gravitational collapse concentrates mass and ignites stars. |
This is a continuation of the previous post on New Newtonian Cosmology: Positive and Negative Mass. We consider the following simplified fluid model with zero pressure:
- $\rho =\Delta\phi$ (1)
- $\frac{\partial\vert\rho\vert}{\partial t} + \nabla\cdot m=0$ (2)
- $\frac{\partial m}{\partial t}+\nabla\cdot (mu)= -\rho\nabla\phi$ (3)
where $\phi (x,t)$ is gravitational potential, $\rho (x,t)$ is mass density, $m$ is momentum, $u(x,t)=\frac{m}{\vert\rho\vert}$ is matter velocity, $x$ is space coordinate in a Euclidean coordinate system and $t$ is a time variable.
Here (1) expresses that mass density $\rho$ of variable sign represents presence of matter with positive and negative mass density assigned by a primordial gravitational potential $\phi$, (2) expresses positive and negative mass conservation and (3) is Newton's 2nd Law connecting change of momentum to gravitational force $-\rho\nabla\phi$, which amounts to attraction between mass densities of the same sign and repulsion between mass densities of different sign.
The model satisfies the following energy balance obtained by multiplying (3) by $u$ and integrating over $x$ :
- $\int\frac{\partial}{\partial t}(\vert\rho\vert\frac{\vert u\vert^2}{2})dx=\int\frac{\partial}{\partial t}(\frac{\vert\nabla\phi\vert^2}{2})dx$
- $\int\vert\rho\vert\vert u\vert^2\, dx=\int\vert\nabla\phi\vert^2dx + C=-\int\rho\phi dx + C$,
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