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Hauptverfasser: Herrera, L., Di prisco, A., Ospino, J.
Format: Preprint
Veröffentlicht: 2024
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2403.07550
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author Herrera, L.
Di prisco, A.
Ospino, J.
author_facet Herrera, L.
Di prisco, A.
Ospino, J.
contents A semi--numerical approach proposed many years ago for describing gravitational collapse in the post--quasi--static approximation, is modified in order to avoid the numerical integration of the basic differential equations the approach is based upon. For doing that we have to impose some restrictions on the fluid distribution. More specifically, we shall assume the vanishing complexity factor condition, which allows for analytical integration of the pertinent differential equations and leads to physically interesting models. Instead, we show that neither the homologous nor the quasi--homologous evolution are acceptable since they lead to geodesic fluids, which are unsuitable for being described in the post--quasi--static approximation. Also, we prove that, within this approximation, adiabatic evolution also leads to geodesic fluids and therefore we shall consider exclusively dissipative systems. Besides the vanishing complexity factor condition, additional information is required for a full description of models. We shall propose different strategies for obtaining such an information, which are based on observables quantities (e.g. luminosity and redshift), and/or heuristic mathematical ansatz. To illustrate the method, we present two models. One model is inspired in the well known Schwarzschild interior solution, and another one is inspired in Tolman VI solution.
format Preprint
id arxiv_https___arxiv_org_abs_2403_07550
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The post--quasi-static approximation: An analytical approach to gravitational collapse
Herrera, L.
Di prisco, A.
Ospino, J.
General Relativity and Quantum Cosmology
Cosmology and Nongalactic Astrophysics
A semi--numerical approach proposed many years ago for describing gravitational collapse in the post--quasi--static approximation, is modified in order to avoid the numerical integration of the basic differential equations the approach is based upon. For doing that we have to impose some restrictions on the fluid distribution. More specifically, we shall assume the vanishing complexity factor condition, which allows for analytical integration of the pertinent differential equations and leads to physically interesting models. Instead, we show that neither the homologous nor the quasi--homologous evolution are acceptable since they lead to geodesic fluids, which are unsuitable for being described in the post--quasi--static approximation. Also, we prove that, within this approximation, adiabatic evolution also leads to geodesic fluids and therefore we shall consider exclusively dissipative systems. Besides the vanishing complexity factor condition, additional information is required for a full description of models. We shall propose different strategies for obtaining such an information, which are based on observables quantities (e.g. luminosity and redshift), and/or heuristic mathematical ansatz. To illustrate the method, we present two models. One model is inspired in the well known Schwarzschild interior solution, and another one is inspired in Tolman VI solution.
title The post--quasi-static approximation: An analytical approach to gravitational collapse
topic General Relativity and Quantum Cosmology
Cosmology and Nongalactic Astrophysics
url https://arxiv.org/abs/2403.07550