Initial data for general relativistic SPH with Centroidal Voronoi Tessellations
Abstract: In this work we present an alternative method to obtain a distribution of particles over an hyper surface, such that they obey a rest-mass density distribution $\rho(xi)$. We use density profiles that can be written as $\rho(x1,x2,x3)=\rho(x1) \rho(x2) \rho(x3)$ in order to be able to use them as a probability density functions. We can find the relation between the chart $xj$ and a uniform random variable $\bar{x}j \in (0,1)$, say $F(xj)=\bar{x}j$. Using the inverse of this function we relate a set of $N$ arbitrary number of points inside a cube with coordinates ${ xj =F{-1}(\bar{x}j)}$ giving the position in order to get the density distribution $\rho(xj)$. We get some noise due to the random distribution and we can notice that each time we relax the configuration on the cube we also get a better distribution of the desired physical configuration described with $\rho(xj)$. This relaxation of the position of the particles in the cube has been performed a Lloyd's algorithm in 3D and we have used {\it Voro++} library in order to get the Voronoi tessellations.
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