TL;DR
This paper develops a new variational approach to modeling relativistic stars, incorporating matter and metric degrees of freedom, leading to novel boundary conditions and insights into stellar structure within General Relativity.
Contribution
It introduces a dynamical action principle with matter and metric degrees of freedom, using a scalar density and velocity potential, and explores its implications for relativistic star models.
Findings
Stars can have finite mass without boundary.
The metric exhibits rapid variation near the Schwarzschild radius.
A new critical relation between radius and mass emerges.
Abstract
We study a system of differential equations that governs the distribution of matter in the theory of General Relativity. The new element in this paper is the use of a dynamical action principle that includes all the degrees of freedom, matter as well as metric. The matter lagrangian defines a relativistic version of non-viscous, isentropic hydrodynamics. The matter fields are a scalar density and a velocity potential; the conventional, four-vector velocity field is replaced by the gradient of the potential and its scale is fixed by one of the eulerian equations of motion, an innovation that significantly affects the imposition of boundary conditions. If the density is integrable at infinity, then the metric approaches the Schwarzschild metric at large distances. There are stars without boundary and with finite total mass; the metric shows rapid variation in the neighbourhood of the…
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